Figure KLMN is congruent to Figure QRST because rigid motions can be used to map Figure KLMN onto Figure QRST.
Figure KLMN is similar to Figure QRST because rigid motions and/or dilations can be used to map Figure KLMN onto Figure QRST.
Since the figures are similar, the scale factor is 2.
What are similar geometric figures?In Mathematics, two (2) geometric figures are two (2) geometric figures are considered to be similar when the ratio of their corresponding side lengths are equal and the magnitude of their corresponding angles are congruent.
Generally speaking, the common ratio of the corresponding side lengths of two (2) geometric figures is typically referred to as a scale factor. Since the given pair of geometric figures is similar, we can calculate the scale factor that maps Figure KLMN onto Figure QRST as follows:
Scale factor = TQ/NK
Scale factor = 10/5
Scale factor = 2.
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Megan used her bike to go to a friend's house, 10 miles away from her house, and then jogged for 8 miles with her friend. The jogging time was one hour longer than her bike ride, and her biking speed was 4 times the jogging speed. Find the speed of Megan on the bike and while jogging, in mph.
Megan's biking speed was 6.4 mph and her jogging speed was 1.6 mph
What is variable ?A variable is a quantity that may change within the context of a mathematical problem.
Let's use the following variables to represent the unknown speed :
v_bike: Megan's biking speed, in miles per hour (mph)v_jog: Megan's jogging speed, in mphWe know that Megan biked for a certain amount of time, and then jogged for one hour longer. Let's use the variable t to represent Megan's biking time, in hours. Then her jogging time is t + 1 hour.
We can use the formula:
distance = rate x time
To create two equations based on the given information.
For the biking distance of 10 miles, we have:
10 = v_bike * t
For the jogging distance of 8 miles, we have:
8 = v_jog * (t + 1)
We also know that Megan's biking speed was 4 times her jogging speed, so we have:
v_bike = 4 * v_jog
We can substitute this equation into the first equation to get:
10 = 4 * v_jog * t
Simplifying this equation, we get:
t = 2.5 * v_jog
We can substitute this equation into the second equation to get:
8 = v_jog * (2.5 * v_jog + 1)
Simplifying this equation, we get:
8 = 2.5 * v_jog^2 + v_jog
Rearranging the terms, we get:
2.5 * v_jog^2 + v_jog - 8 = 0
We can solve this quadratic equation using the quadratic formula:
v_jog = (-1 ± sqrt(1 + 4 * 2.5 * 8)) / (2 * 2.5)v_jog = (-1 ± sqrt(81)) / 5v_jog = (-1 ± 9) / 5v_jog = 1.6 mph (ignoring the negative solution)Finally, we can use the equation v_bike = 4 * v_jog to find Megan's biking speed:
v_bike = 4 * 1.6 mph = 6.4 mph
Therefore, Megan's biking speed was 6.4 mph and her jogging speed was 1.6 mph
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PLEASE HELP ME I NEED THIS FAST TO PASS!!
Answer:-225
Step-by-step explanation:The arithmetic series is given by:
a1 = -1, d=-2, n = 15
where a1 is the first term, d is the common difference, and n is the number of terms.
To evaluate this series, we can use the formula for the sum of an arithmetic series:
Sn = n/2 * [2a1 + (n-1)d]
where Sn is the sum of the first n terms.
Substituting the given values, we get:
S15 = 15/2 * [2(-1) + (15-1)(-2)]
= 15/2 * [-2 - 28]
= 15/2 * (-30)
= -225
Therefore, the sum of the first 15 terms of the arithmetic series with a1 = -1, d=-2 is -225.
Carly picked m mangoes
a) On Monday, she added 4 mangoes to what she picked and shared the total equally into 2 groups. Write an expression to represent the number of mangoes in each group.
b) On Tuesday, she had twice the number of mangoes picked then added 2 more mangoes. If she shared this total into 3 equal groups, write an expression to represent the number of mangoes in
each group.
c) If Carly subtracted the number of mangoes in each group on Tuesday from the number of mangoes in each group on Monday, she will have 3 mangoes left Write an equation to represent
this information.
d) Hence, calculate the number of mangoes she picked.
The number of mangoes she picked is 2.
What is number?Number is the concept of a mathematical object used to count, measure, and label. It is an abstract concept, though most familiar in the form of numerals such as "3" or "10". Numbers allow us to compare and manipulate amounts, sequences, shapes, and patterns. They also allow us to create models and make predictions. As a result, they are essential tools in a variety of disciplines, from mathematics and physics to engineering and economics.
Let x be the number of mangoes in each group on Monday. The expression representing the number of mangoes in each group is x + 4/2 = x + 2.
b) Let y be the number of mangoes in each group on Tuesday. The expression representing the number of mangoes in each group is 2y + 2/3 = 2y + 2/3.
c) Let z be the number of mangoes left after subtracting the number of mangoes in each group on Tuesday from the number of mangoes in each group on Monday. The equation representing this information is x + 2 - (2y + 2/3) = z.
d) Substituting the expression for x and y in the equation, we get: (2y + 2/3) + 2 - (2y + 2/3) = z.
Solving the equation, we get z = 2.
Hence, the number of mangoes she picked is 2.
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How to verify with steps?
[tex]csc(-x)-1~~ = ~~\cfrac{cos^2(x)}{csc(-x)+1} \\\\[-0.35em] ~\dotfill\\\\ \cfrac{cos^2(x)}{csc(-x)+1}\implies \cfrac{1-sin^2(x)}{\frac{1}{sin(-x)+1}}\implies \cfrac{1-sin^2(x)}{\frac{1}{-sin(x)+1}}\implies \cfrac{[1-sin(x)][1+sin(x)]}{ ~~ \frac{-1+sin(x)}{sin(x)} ~~ } \\\\\\\ [1-sin(x)][1+sin(x)]\cdot \cfrac{sin(x)}{-1+sin(x)} \\\\\\\ [1-sin(x)][1+sin(x)]\cdot \cfrac{sin(x)}{-[1-sin(x)]} \\\\\\\ [1+sin(x)][-sin(x)] \implies \boxed{-sin(x)-sin^2(x)} \\\\[-0.35em] ~\dotfill[/tex]
[tex]csc(-x)-1\implies \cfrac{1}{sin(-x)}-1\implies \cfrac{1}{-sin(x)}-1\implies \boxed{\cfrac{-1-sin(x)}{sin(x)}}[/tex]
now, as you can see is a no dice, before doing many simplifications, I often check them graphically, so I know what's cooking, anyhow, Check the picture below, they are definitely not the same, the red one is the one on the right-hand-side.
Use the long division to divide f(x) =b^4 + 3b^3-35b^2-46b+28 by d(x)= b+7 remember to show all your work cleary steps by steps and express your final answer in the from f(x)= q(x)d(x) +r(x)
The final function is f(x) = ( [tex]b^3-4b^2[/tex]+[tex]63b[/tex]-487b)(b+7)+3021.
What is function?
A mathematical phrase, rule, or law that establishes the link between an independent variable and a dependent variable (the dependent variable). In mathematics, functions exist everywhere, and they are crucial for constructing physical links in the sciences.
Here the given function f(x)=[tex]b^4 + 3b^3-35b^2-46b+28[/tex] and d(x)=b+7.
Now using long division then,
=> [tex]b^3-4b^2[/tex]+[tex]63b[/tex]-487b
[tex]\\b+7)\overline{b^4 + 3b^3-35b^2-46b+28 }\\\\[/tex]
(-) [tex]{b^4+7b^3}[/tex]
[tex]\overline{-4b^3+35b^2+46b-28}[/tex]
(-) [tex]-4b^3-28b^2[/tex]
[tex]\overline{63b^2-46b+28}[/tex]
(-) [tex]63b^2+441b[/tex]
[tex]\overline{-487b-28}[/tex]
(-) [tex]\underline {-487b-3049}[/tex]
3021
Quotient q(x) = [tex]b^3-4b^2[/tex]+[tex]63b[/tex]-487b
Remainder r(x) = 3021
Hence the final function is f(x) = ( [tex]b^3-4b^2[/tex]+[tex]63b[/tex]-487b)(b+7)+3021.
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Classify the events as independent or not independent. Events A and B where P(A) = 0.7, P(B) = 0.8, and P(A and B) = 0.56
The given events A and B are two independent events.
Independent and Non-independent events:In probability, independent events are those events where the occurrence of one event does not affect the probability of the other event occurring.
On the other hand, non-independent events are those events where the occurrence of one event affects the probability of the other event occurring.
If A and B are two independent events then
P(A and B) = P(A) * P(B)Here we have
A and B are two events
where P(A) = 0.7, P(B) = 0.8, and P(A and B) = 0.56
Using the above formula,
=> P(A and B) = (0.7) (0.8) = 0.56
=> P(A and B) = 0.56
From the data, P(A and B) = 0.56
Therefore,
The given events A and B are two independent events.
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(a) find the value of x that maximizes the area of the
figure and (b) find the maximum area.
x in.
x in.
1.5x in.
6 in.
The value of x that maximizes the area of the figure is 1.5 inches, and the maximum area is 3.375 square inches.
What is rectangle ?A rectangle is a two-dimensional form that has four full sides and four right angles. Because the opposing sides are parallel and congruent, it is a unique kind of parallelogram.
To find the maximum area of the figure, we need to determine the value of x that will maximize the area.
The area of the figure can be calculated as:
A = (1.5x)(x) + (1/2)(1.5x)(6-2x)
Simplifying the expression:
[tex]A = 1.5x^2 + 4.5x - 3x^2[/tex]
[tex]A = -1.5x^2 + 4.5x[/tex]
To find the value of x that maximizes the area, we need to take the derivative of A with respect to x and set it equal to zero:
dA/dx = -3x + 4.5 = 0
Solving for x:
3x = 4.5
x = 1.5 inches
Now that we know x=1.5 inches maximizes the area, we can substitute it back into the area equation to find the maximum area:
[tex]A = -1.5(1.5)^2 + 4.5(1.5)[/tex]
A = 3.375 square inches
Therefore, the value of x that maximizes the area of the figure is 1.5 inches and the maximum area is 3.375 square inches.
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Write an equation for the hyperbola shown In the graph.
The equation for the hyperbola is [tex]y^{2} -4x^{2} =144[/tex]
Define the term hyperbola ?A hyperbola is a type of conic section, formed by the intersection of a plane with two cones that have a common vertex. It consists of two separate curves that are mirror images of each other, each of which has two branches that extend to infinity.
By Given figure,
C = (0, 0)
V (0, ±6)
b = 6
equation of asymptotes; [tex]y=[/tex] ±[tex]\frac{a}{b}x[/tex]
then, y = ± [tex]\frac{a}{6} * x[/tex]
given the asymptotes, y = ±2x
by comparing we get, a/6 = 2
a = 12
We know the equation of hyperbola, [tex]\frac{y^{2} }{a^{2} } -\frac{x^{2} }{b^{2} } =1[/tex]
putting the values of a and b, [tex]\frac{y^{2} }{12^{2} } -\frac{x^{2} }{6^{2} } =1[/tex]
[tex]\frac{y^{2} }{144} } -\frac{x^{2} }{36} } =1[/tex]
After Simplification, [tex]y^{2} -4x^{2} =144[/tex]
Therefore, the equation for the hyperbola is [tex]y^{2} -4x^{2} =144[/tex]
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Simplify:
2
(
3
x
)
+
(
x
+
10
)
2(3x)+(x+10)
Answer:
7x+10
Step-by-step explanation:
2x(3x)+1x(x+10)
6x+1x+10
7x+10
If m/P = (4x - 1)° and m/R = (12x - 27), find mQPS.
The arc angle QPS is 258 degrees.
How to find the angles of a cyclic quadrilateral?A cyclic quadrilateral is a four sided shape(quadrilateral) that can be inscribed into a circle. The sum of angles in a cyclic quadrilateral is 360 degrees.
The opposite angles of a cyclic quadrilateral have a total of. 180 ° . In other words, the opposite angles of a cyclic quadrilateral is supplementary angles.
Therefore,
m∠P = 4x - 1
m∠R = 12x - 27
Hence,
4x - 1 + 12x - 27 = 180
16x - 28 = 180
16x = 180 + 28
16x = 208
x = 208 / 16
x = 13
m∠R = 12(13) - 27
m∠R = 156 - 27
m∠R = 129 degrees
Therefore,
m∠R = 1 / 2 (QPS)
129 = 1 / 2 × x
x = 129 ×2
x = 258 degrees
Hence,
mQPS = 258 degrees
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Solve and graph the following compound inequality 4-m<-2 or 12<-5m+2. Solve before labeling the number line.
As a result, the compound inequality has the following solutions: m > 6 or m < -2 as by split both sides by -5 and reverse the inequality.
what is inequality ?An inequality in mathematics is a comparison between two values or expressions that specifies whether they are equal, greater than, or less than one another. "!=" (greater than or equal to), and "=" (less than or equal to) are used to represent inequality (not equal to). For instance, the inequality "x > 2" denotes that the value of x is more than 2, while the inequality "5 7" denotes that 5 is less than 7. Variables may be utilized in inequalities, which can be used to indicate a variety of values or circumstances that satisfy the inequality.
given
Let's resolve each inequality in turn, then add the results:
4 - m < -2 (subtract 4 from both sides) (subtract 4 from both sides)
-m < -6 (divide both sides by -1 and invert the inequality) (divide both sides by -1 and reverse the inequality)
m > 6
12 < -5m + 2 (subtract 2 from both sides) (subtract 2 from both sides)
10 < -5m (split both sides by -5 and reverse the inequality) (divide both sides by -5 and reverse the inequality)-2 > m
As a result, the compound inequality has the following solutions: m > 6 or m < -2 as by split both sides by -5 and reverse the inequality.
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A delivery truck is transporting boxes of two sizes: large and small. The combined weight of a large box and a small box is 70 pounds. The truck is transporting 50 large boxes and 60 small boxes. If the truck is carrying a total of 3800 pounds in boxes, how much does each type of box weigh?
Answer: Large box weight 40 pounds, and small box weight 30 pounds.
Step-by-step explanation:
Let L be the weight of a large box, and S be the weight of a small box.
L + S = 70
50L + 60S = 3800
We change the first equation into the form of L, and we get:
L = 70 - S
And we plugin L = 70 - S into the second equation.
50(70 - S) + 60S = 3800
3500 - 50S + 60S = 3800
3500 + 10S = 3800
-3500 -3500
10S = 300
S = 30
L + S = 70
L + 30 = 70
- 30 - 30
L = 40
A normal population has a variance of 9.0. A random sample of size 9 and
variance 8.01 was drawn from a normal population. Determine whether the
variance from this random sample is 9.0. Test at 5% level of significance.
We can cοnclude that the variance frοm this randοm sample is nοt significantly different frοm 9.0 at a 5% level οf significance.
What is Variance?In mathematics, variance is a measure οf the spread οr dispersiοn οf a set οf data values. It is calculated as the average οf the squared differences frοm the mean. Variance is cοmmοnly used in statistics tο assess the variability οf a data set and is an impοrtant parameter in many statistical analyses.
Tο test whether the variance frοm this randοm sample is equal tο 9.0, we can use a chi-square test. The test statistic fοr this hypοthesis test is calculated as:
chi-square = (n - 1) × sample variance / pοpulatiοn variance
where n is the sample size.
Substituting the given values, we get:
chi-square = (9 - 1) × 8.01 / 9.0
chi-square ≈ 6.71
The critical chi-square value at a 5% level οf significance and 8 degrees οf freedοm (n - 1) is 15.51. Since the calculated chi-square value οf 6.71 is less than the critical chi-square value οf 15.51, we fail tο reject the null hypοthesis that the variance frοm this randοm sample is equal tο 9.0. In οther wοrds, there is nοt enοugh evidence tο suggest that the variance frοm this randοm sample is different frοm 9.0 at a 5% level οf significance.
Therefοre, we can cοnclude that the variance frοm this randοm sample is nοt significantly different frοm 9.0 at a 5% level οf significance.
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Weight | COST
20kg and below 2.00 Naira
Over 20kg and up to 50kg. 9.50 Naira
Over 50kg and up to 100kg 12.30 Naira
Over 100kg and up to 500kg 21.10 Naira
Use the table below to calculate the cost of sending 151kg parcel.=
Use the same table to find the cost of sending 507kg parcel =
Stamp rate:
Stamp | COST
10 stamps and below 55.00Naira
Over 10 stamps up to 50 stamps. 75.00Naira
Over 50 stamps up to 100 stamps 105.00Naira
Find the cost of buying 150 stamps using the table above=
Find the cost of buying 213 stamps with the table above=
Step-by-step explanation:
For a 151kg parcel, we can see that it falls under the category of "Over 100kg and up to 500kg", so the cost would be 21.10 Naira per kg:
Cost of sending 151kg parcel = 21.10 Naira/kg * 151 kg = 3187.10 Naira
For a 507kg parcel, we can see that it falls under the category of "Over 100kg and up to 500kg", so the cost would be 21.10 Naira per kg:
Cost of sending 507kg parcel = 21.10 Naira/kg * 507 kg = 10701.70 Naira
To find the cost of buying stamps, we need to check which category the number of stamps falls under. For 150 stamps, it falls under the category of "Over 10 stamps up to 50 stamps", so the cost would be 75.00 Naira:
Cost of buying 150 stamps = 75.00 Naira
For 213 stamps, it falls under the category of "Over 50 stamps up to 100 stamps", so the cost would be 105.00 Naira:
Cost of buying 213 stamps = 105.00 Naira
Algebra 1 please help
An exponential function is a function in which the independent variable x appears as an exponent.
a is the y-intercept.
b is the rate of change.
The function is exponential growth when b > 1.
The function is exponential growth when b < 1.
y-intercept is the initial value of the function when x is equal to 0.
Asymptote is the line that the function approaches but does not cross.
What is an exponential function?In Mathematics, an exponential function can be modeled by using this mathematical expression:
f(x) = ab^x
Where:
a represents the base value or y-intercept.x represents time.b represents the rate of change.What is an asymptote?In Mathematics, an asymptote can be defined as a line which the graph of a given function approaches but would never touch or cross.
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If $f(x)=4x^3+1$, find $f^{-1}(33)$.
The value of the inverse function of f(x), that is, f⁻¹(33) is 2.
How is the inverse function of a given function found?A function takes in values, applies specific operations to them, and produces an output. The inverse function acts, agrees with the outcome, and returns to the initial function. In general, switching the coordinates x and y is how an inverse is calculated. Although not strictly a function, this freshly constructed inverse is a relation.
To guarantee that the original function's inverse will likewise be a function, the original function must be a one-to-one function. Only when every second element matches the first value is a function deemed to be a one-to-one function.
Given that,
f(x)=4x³+1
Also, f⁻¹(33).
Thus, using the input and output corresponding values we have:
f(x) = 4x³ + 1 = 33
x³ = 8
Taking the cube root of both sides, we get:
x = 2
Hence, the value of the inverse function of f(x), that is, f⁻¹(33) is 2.
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given that f(x)=(x+2)^3-3, write an expression for h(x) in terms of x
h(x)=
In response to the query, we can state that As a result, the cubic equation factored form is: f(x) = (x+3)(x+1)(x-2) (x-2)
What is equation?An equation is a mathematical statement that proves the equality of two expressions connected by an equal sign '='. For instance, 2x – 5 = 13. Expressions include 2x-5 and 13. '=' is the character that links the two expressions. A mathematical formula that has two algebraic expressions on either side of an equal sign (=) is known as an equation. It depicts the equivalency relationship between the left and right formulas. L.H.S. = R.H.S. (left side = right side) in any formula.
A cubic polynomial's graph is the one that is presented. We must determine the polynomial's x-intercepts or roots in order to determine its factored form.
The graph reveals the polynomial's three real roots, which are -3, -1, and 2.
As a result, the polynomial's factored form is:
f(x) = a(x+3)(x+1) (x-2)
where an is a constant that establishes the polynomial's leading coefficient. Using the graph's point (0,-6) as a reference, we may determine the value of a:
f(0) = a(0+3)(0+1)(0-2) = -6
If we condense this phrase, we get:
-6a = -6
When we multiply both sides by -6, we get:
a = 1
As a result, the cubic polynomial's factored form is:
f(x) = (x+3)(x+1)(x-2) (x-2)
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Answer this question please
Answer:
Reflection only
The mirror line must pass through one of the sides of the triangle.
============================================================
Explanation:
The term "invariant" means "does not vary" i.e. "does not change".
An invariant point is fixed in place.
Here are the list of geometric transformations
Translation (aka shifting)RotationReflectionDilationSome geometry textbooks will mention "glide reflection", but that's really just a combination of translation and reflection. That means we can ignore it.
Let's go through each item to see if we can get two vertices to stay glued in their spot.
With translations, it's impossible to have invariant points. Every point will change location. Therefore, we cannot have two invariant vertices for any translation. We cross translation off the list.Rotations are a little better. We have one point that doesn't move: the center of rotation. Unfortunately every other point that isn't the center will rotate around the center (and hence change location). We cross rotations off the list.Reflections are the transformation that will be able to hold two vertices fixed in place. Any point on the mirror line will not change location. If we draw the mirror line through a side of the triangle, then it will guarantee two vertices will stay in place. This is why reflection is the only answer.Dilations are similar to rotations in that they have one invariant point. The center of dilation stays where it is, but everything else moves closer to the center (if the scale factor is between 0 and 1) or moves away from the center (if the scale factor is larger than 1). We cross dilations off the list.In short we have eliminated: translations, rotations, and dilations. The only thing that works is reflections
[tex]x^{2} logx=10xx^{2}[/tex]x^2logx = 10x2
[tex]\begin{array}{llll} \textit{Logarithm Cancellation Rules} \\\\ log_a a^x = x\qquad \qquad \stackrel{ \textit{we'll be using this one} }{a^{log_a (x)}=x} \end{array} \\\\[-0.35em] ~\dotfill\\\\ x^2\log(x)=10x^2\implies \log(x)=\cfrac{10x^2}{x^2}\implies \log(x)=10 \\\\\\ \log_{10}(x)=10\implies 10^{\log_{10}(x)}=10^{10}\implies x=10^{10}\implies x=10000000000[/tex]
Suppose that the weight of seedless watermelons is normally distributed with mean 6.1 kg. and standard deviation 1.2 kg. Let X be the weight of a randomly selected seedless watermelon. Round all answers to 4 decimal places where possible.
a. What is the distribution of X? X ~ N(
b. What is the median seedless watermelon weight?
c. What is the Z-score for a seedless watermelon weighing 7 kg?
d. What is the probability that a randomly selected watermelon will weigh more than 5.1 kg?
e. What is the probability that a randomly selected seedless watermelon will weigh between 5.3 and 6 kg?
f. The 85th percentile for the weight of seedless watermelons is
Answer:
a. X ~ N(6.1, 1.2^2)
b. The median seedless watermelon weight is 6.1 kg.
c. The Z-score for a seedless watermelon weighing 7 kg is 0.75.
d. The probability that a randomly selected watermelon will weigh more than 5.1 kg is 0.7967.
e. The probability that a randomly selected seedless watermelon will weigh between 5.3 and 6 kg is 0.2454.
f. The 85th percentile for the weight of seedless watermelons is 7.2437 kg.
Step-by-step explanation:
a. X ~ N(6.1, 1.2^2)
b. The median of a normal distribution is equal to the mean, so the median seedless watermelon weight is 6.1 kg.
c. The Z-score for a seedless watermelon weighing 7 kg can be calculated as:
Z = (7 - 6.1) / 1.2 = 0.75
Therefore, the Z-score is 0.75.
d. To find the probability that a randomly selected watermelon will weigh more than 5.1 kg, we need to standardize the value using the formula:
Z = (X - μ) / σ
where X is the value we want to find the probability for, μ is the mean, and σ is the standard deviation.
Z = (5.1 - 6.1) / 1.2 = -0.8333
Using a standard normal distribution table or a calculator, we can find the probability that Z is greater than -0.8333 to be 0.7967.
Therefore, the probability that a randomly selected watermelon will weigh more than 5.1 kg is 0.7967.
e. To find the probability that a randomly selected seedless watermelon will weigh between 5.3 and 6 kg, we need to standardize the values and find the area under the normal curve between the two Z-scores. The Z-scores for 5.3 kg and 6 kg are:
Z1 = (5.3 - 6.1) / 1.2 = -0.6667
Z2 = (6 - 6.1) / 1.2 = -0.0833
Using a standard normal distribution table or a calculator, we can find the probability that Z is between -0.6667 and -0.0833 to be 0.2454.
Therefore, the probability that a randomly selected seedless watermelon will weigh between 5.3 and 6 kg is 0.2454.
f. The 85th percentile for the weight of seedless watermelons can be found by finding the Z-score that corresponds to the 85th percentile of a standard normal distribution. Using a standard normal distribution table or a calculator, we can find the Z-score to be 1.0364.
To find the corresponding weight, we can use the formula:
Z = (X - μ) / σ
1.0364 = (X - 6.1) / 1.2
X = 7.2437
Therefore, the 85th percentile for the weight of seedless watermelons is 7.2437 kg.
Hope this helps! I'm sorry if it doesn't. If you need more help, ask me! :]
Answer:
a) N(6.1,1.2)
b) 6.1
c) 0.75
d) 0.7977 (or 79.77%)
e) 0.2143 (or 21.43%)
f) 7.3435 kg (using excel) or 7.348 kg (using normal tables)
Step-by-step explanation:
a) normal distribution just need to be define we his mean and his standard deviation. You just need a sample higher than 30 or to be specified the population is normally distributed
X≈N(μ,σ)= N(6.1,1.2)
b) The median and mean are not necessarily the same, for a normal distribution, which is a symmetric distribution, those values are just the same
c) The equation for Z score is given by:
[tex]z=\frac{x-u}{\sigma}[/tex]
Replacing values:
[tex]Z=\frac{7-6.1}{1.2} =0.75[/tex]
d) first find the Zvalue for 5.1
[tex]Z=\frac{5.1-6.1}{1.2} =-0.83[/tex]
Now, find the probability from Normal Distribution table
P(Z>0.83) = 0.7977
e)
first find the Zvalue fo5.3 and 6
[tex]Z=\frac{5.3-6.1}{1.2} =-0.67[/tex]
[tex]Z=\frac{6-6.1}{1.2} =-0.08[/tex]
Now find probabilities from Normal Distribution table . Notice you need to subtract P(Z>0.08)-P(Z>0.67) if you use a positive table.
P(-0.67<z<-0.08) = 0.2143
f) Find the Z score from a Normal Distribution table that give you an area of 0.8500 (or the closest value), im using excel for this one since the answer from tables have only TWO decimals and can be problematic if you need more decimal places.
this gives a Z of 1.036433389
now use the Zscore equation but solve for X
[tex]z\sigma+u=x[/tex]
x = 1.036433389(1.2)+6.1 = 7.3437 (Using excel)
If i use a table, the closes is 1.04 (0.8508 which is not exactly 0.85)
x = 1.04(1.2)+6.1= 7.348 (using table)
so be carefully with the input if the website needs the decimals places or not.
1. Simply the answers
2. State domain in interval notation
When a variable (or set of letters) in an algebraic statement is substituted, its numerical value is used instead. The expression's total value can then be calculated.
What is the substitute f(x) for x in the expression?Using the given functions, we have:
[tex]f(x) = x^2 + 3[/tex]
[tex]g(x) =[/tex] [tex]\sqrt{(x-4)}[/tex]
To find f(g(x)), we substitute g(x) for x in the expression for f(x):
[tex]f(g(x)) = (g(x))^2 + 3[/tex]
= ([tex]\sqrt{(x-4))^2 + 3}[/tex]
[tex]= (x-4) + 3[/tex]
[tex]= x - 1[/tex]
Therefore,[tex]f(g(x)) = x - 1.[/tex]
To find g(f(x)), we substitute f(x) for x in the expression for g(x):
[tex]g(f(x)) =[/tex] [tex]\sqrt{((f(x)) - 4)}[/tex]
= [tex]\sqrt{((x^2 + 3) - 4)}[/tex]
= [tex]\sqrt{(x^2 - 1)}[/tex]
= |x|[tex]\sqrt{(x^2 - 1)}[/tex]
Therefore, [tex]g(f(x)) =[/tex] |x| [tex]\sqrt{(x^2 - 1)}[/tex]
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Leticia invests $200 at 5% interest. If f(x) represents the amount of money after x time periods, which exponential function best represents this situation?
The amount of money Leticia has after x time periods can be calculated using the formula:
f(x) = P(1 + r)^x
where P is the principal (initial amount invested), r is the annual interest rate (expressed as a decimal), and x is the number of time periods.
Substituting the given values, we get:
f(x) = 200(1 + 0.05)^x
Simplifying this expression, we get:
f(x) = 200(1.05)^x
Therefore, the exponential function that best represents this situation is:
f(x) = 200(1.05)^x
li
People can pick strawberries on a farm.
The pay for the strawberries they pick.
Brian picks 4 ½ kg of strawberries.
He pays a total of £15.75.
Sue wants 500 grams of strawberries.
Brian says she can buy them from him for the same price he paid.
How much should Sue pay Brian for 500 grams of strawberries?
Answer:
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Robert packs potatoes into bags.
He then packs bags into boxes to sell to shops.
Robert has these orders.
P Flag question
Browns
25 hoxes
Brian will receive £[tex]1.75[/tex] from Sue buying [tex]500[/tex] grams of berries.
What is grams vs. kg?The metric measure for a tiny amount of mass and weight is the gram (g). It weighs the same as one milliliter (or one cubic centimeter) of water. 1,000 grams make to one kilogram (kg). One liter liquid water weighs exactly one kilogram (kg).
How should I weigh a gram?Using a scale is the most accurate technique to measure in grams. Kitchen spoons and cups, for example, offer an approximate approximation. Moreover, always have a conversion tool or chart on available so you can estimate grams without a scale.
Brian paid a total of £[tex]15.75[/tex] for [tex]4\frac{1}{2}[/tex] kg of strawberries. To find out the price per gram, we can divide the total cost by the total weight:
Price per gram [tex]=[/tex]Total cost / Total weight
Total weight of strawberries [tex]= 4.5 kg = 4500 grams[/tex]
Price per gram [tex]=[/tex] £[tex]15.75 / 4500[/tex] grams
Price per gram [tex]=[/tex] £[tex]0.0035[/tex] per gram
So, Brian paid £[tex]0.0035[/tex] for every gram of strawberries he picked.
Cost of [tex]500[/tex] grams [tex]=[/tex] [tex]500 grams *[/tex] £[tex]0.0035/gram[/tex]
Cost of [tex]500[/tex] grams [tex]=[/tex] £[tex]1.75[/tex]
Therefore, Sue should pay Brian £[tex]1.75[/tex] for [tex]500[/tex] grams of strawberries.
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The area of a rectangular rug is given by the trinomial r^2 - 8r - 33. What are the possible dimensions of the rug? Use factoring.
The required possible dimensions of the rug are 11 by [tex]\frac{r^2 - 8r - 33}{11}[/tex].
How to factor the equation to find dimensions?The area of the rectangular rug is given by the trinomial:
[tex]$r^2 - 8r - 33$[/tex]
To find the possible dimensions of the rug, we need to factor this trinomial. We can do this by finding two numbers that multiply to -33 and add up to -8. These numbers are -11 and 3:
[tex]$r^2 - 8r - 33 = (r - 11)(r + 3)$[/tex]
Therefore, the possible dimensions of the rug are:
[tex]$r - 11 = 0$[/tex] or [tex]$r + 3 = 0$[/tex]
[tex]$r = 11$[/tex]or $[tex]$r = -3$[/tex]
Since the dimensions of the rug cannot be negative, we can only take the positive value of r, which is r = 11.
Therefore, the possible dimensions of the rug are:
11 by [tex]\frac{r^2 - 8r - 33}{11}[/tex]
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A parallelogram has a height of 5 units. One side of the parallelogram is AB⎯⎯⎯⎯⎯. The parallelogram has no right angles.
Draw the parallelogram using the Polygon tool.
Each segment of the grid represents 1 unit.
Keyboard Instructions
Initial graph state
The horizontal axis goes from 1.5 to 12.5 with ticks spaced every 1 unit(s).
The vertical axis goes from 1.5 to 12.5 with ticks spaced every 1 unit(s).
Point with coordinates (2, 3) labelled: A.
Point with coordinates (8, 3) labelled: B.
Parallelogram, In Euclidean geometry, a parallelogram is a simple quadrilateral with two(2) pairs of parallel sides.
What is Parallelogram?A parallelogram is a geometric object with sides that are parallel to one another in two(2) dimensions. It is a form of a polygon with four(4) sides (sometimes known as a quadrilateral) in which each parallel pair of sides have the same length.
A Quadrilateral is a closed shape and a type of polygon that has four sides, four(4) vertices and four angles. It is formed by joining(connecting) four non-collinear points. The sum of the interior angles of quadrilaterals(4 sides) is always equal to 360 degrees.
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Can someone explain me how to do this task please? Thank you
12) the common multiples of 3 and 5 up to 50 are: 15, 30, 45.
13) the common multiples of 4 and 6 up to 50 are: 12, 24, 36, 48.
14) the common multiples of 3 and 7 up to 50 are: 12, 42.
15) the equivalent fraction of 3/4 is 6/8
16) the equivalent fraction of 2/3 is 4/6
17) the equivalent fraction of 4/5 is 8/10
18) In its simplest form, 4/12 is 1/3
19) In its simplest form, 6/10 is 3/5
20) In its simplest form, 4/8 is 1/2.
What is the justification for the above response?12) To find the common multiples of 3 and 5 up to 50, we can simply list the multiples of 15 (which is the least common multiple of 3 and 5) that are less than or equal to 50.
Multiples of 15: 15, 30, 45
Therefore, the common multiples of 3 and 5 up to 50 are:
15, 30, 45
13)
To find the common multiples of 4 and 6 up to 50, we can again find the least common multiple of 4 and 6, which is 12, and list its multiples that are less than or equal to 50.
Multiples of 12: 12, 24, 36, 48
Therefore, the common multiples of 4 and 6 up to 50 are:
12, 24, 36, 48
14)
To find the common multiples of 3 and 7 up to 50, we can again find the least common multiple of 3 and 7, which is 21, and list its multiples that are less than or equal to 50.
Multiples of 21: 21, 42
Therefore, the common multiples of 3 and 7 up to 50 are:
21, 42
15)
To write an equivalent fraction of 3/4, we can multiply or divide both the numerator and denominator of 3/4 by the same non-zero number. This will give us a fraction that has the same value as 3/4 but with a different numerator and denominator.
For example, if we multiply both the numerator and denominator of 3/4 by 2, we get:
3/4 * 2/2 = 6/8
Therefore, an equivalent fraction of 3/4 is 6/8.
replicating this logic for 16 and 17, we have:
16) the equivalent fraction of 2/3 is 4/6 and
17) the equivalent fraction of 4/5 is 8/10
18) to get the simplest form of 4/12, we can divide the numerator and denominator by 4 to get
(4/4)/(12/4)
= 1/3
replicate this logic for 19 and 20, and we get:
19) In its simplest form, 6/10 is 3/5
20) In its simplest form, 4/8 is 1/2.
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determine whether f (x) x^2-2x-3/x^2+3x+2 has any holes. if it does, give coordinates
Answer:
hole at (- 1, - 4 )
Step-by-step explanation:
If f(x) has terms that cancel , on the numerator/ denominator then a discontinuity corresponding to that factor is removable and there is a hole.
f(x) = [tex]\frac{x^2-2x-3}{x^2+3x+2}[/tex] ← factor numerator and denominator
= [tex]\frac{(x-3)(x+1)}{(x+2)(x+1)}[/tex] ← cancel (x + 1) on numerator/ denominator
= [tex]\frac{x-3}{x+2}[/tex]
this indicates that x + 1 = 0 ( or x = - 1) is a removable discontinuity and the graph has a hole in it.
substitute x = - 1 into the remaining f(x) for y- coordinate of hole
f(- 1) = [tex]\frac{-1-3}{-1+2}[/tex] = [tex]\frac{-4}{1}[/tex] = - 4
coordinates of hole are (- 1, - 4 )
Answer:
Yes, this function has one hole
This occurs at [tex](-1, -4)[/tex]
Step-by-step explanation:
Definition of hole
A hole on a rational function represents the fact that the function approaches the point, but is not actually defined on that precise x value.
Given function
[tex]f(x) = \dfrac{x^2-2x\:-3}{x^2+\:3x\:+\:2}\\[/tex]
Factor the numerator:
[tex]x^2 - 2x - 3 = (x+1)(x - 3)[/tex]
Factor the denominator:
[tex]x^2+\:3x\:+\:2 = (x + 1)(x + 2)[/tex]
Hence
[tex]\begin{aligned}f(x) & = \dfrac{x^2-2x\:-3}{x^2+\:3x\:+\:2}\\\\& = \dfrac{ (x+1)(x - 3)}{(x + 1)(x + 2)}\\\\ &= \dfrac{x - 3}{x+2} \end{aligned}[/tex]
The common factor is [tex](x + 1)[/tex]
Set this = 0 to find the hole:
[tex]x + 1 = 0 = > x = -1[/tex]
So at[tex]x = -1[/tex] there is a hole.
Substitute this value of x in the factored function to get the y value for the hole
We have
[tex]f(x) = \dfrac{x - 3}{x+2}[/tex]
[tex]\begin{aligned}f(2) &= \dfrac{-1 - 3}{-1 + 2}\\& = \dfrac{-4}{1}\\&= -4\end{aligned}[/tex]
So the hole occurs at [tex](-1, -4)[/tex]
Question 1
Christi alters a skirt. She cuts 7 inches off the bottom of the skirt and then adds a 5-
inch ruffle to the skirt's remaining bottom edge. Which expression best represents the
final length of the skirt?
Os-12
O2+s
02-s
1 pts
OS-2
Step-by-step explanation:
Let's call the original length of the skirt "l". After cutting 7 inches off the bottom, the remaining length of the skirt is l-7. Then, when Christi adds a 5-inch ruffle, the final length of the skirt becomes:
(l-7) + 5
Simplifying this expression, we get:
l - 2
Therefore, the expression that best represents the final length of the skirt is:
O2 - s
On Monday, the worker drove a total of 134 work-related and personal miles. She received $32.13 for the work-related miles she drove on Monday. what percent of her total miles driven were work-related on Monday
Answer:
Step-by-step explanation:
If the worker drove a total of 134 miles on Monday, and received $32.13 for the work-related miles, then we can assume that the work-related miles pay rate is constant, and calculate the total pay for all the miles:
Total pay for all miles = Total miles * Pay rate per mile
Since the worker received $32.13 for the work-related miles, and we assume a constant pay rate, we can find the pay rate per mile:
Pay rate per mile = Total pay for all miles / Total miles
= $32.13 / Total work-related miles
Now we can use this pay rate per mile to calculate the percentage of work-related miles:
Percentage of work-related miles = (Pay for work-related miles / Pay rate per mile) / Total miles * 100
Plugging in the given values, we get:
Percentage of work-related miles = (32.13 / (134 - 32.13)) / (134) * 100
= 0.2874 * 100
= 28.74%
Therefore, approximately 28.74% of the worker's total miles driven on Monday were work-related.
If X is a discrete uniform random variable ranging from 0 to 12 find
The calculated value of probability, P(X≥10) is option b) 0.1666
What is probability?Probability refers to possibility. The subject of this mathematical discipline is the occurrence of random events. An event is occur by a chance.
Since the given distribution is uniform, the percentage of data set lying between any two consecutive values of X is given by:
[tex]= \frac{100\ \% }{Maximum \ possible\ X - minimum\ possible\ X}[/tex]
[tex]= \frac{100\ \%}{(12\ -\ 0)}[/tex]
[tex]= \frac{100\ \%}{12}[/tex]
[tex]= 8.33\ \%[/tex]
The probability of X having a value that is greater than or equal to 10 i.e.
P(X≥10) is given by:
[tex]= (12- 10) * Percentage \ of data set \ lying\ between \ any two \ values \ of\ x[/tex]
[tex]=2*8.33\%[/tex]
[tex]=16.66\%[/tex]
[tex]=0.1666[/tex]
The calculated value of probability, P(X≥10) is 0.1666.
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