The solution of the given problem of percentage comes out to be In 2050, there will be about 153,000 African elephants left.
What does a percentage actually mean?In statistics, a "a%" is a figure or statistic that is expressed as a percentage of 100. The words "pct," "pct," but instead "pc" are also not frequently used. However, the sign "%" is frequently used to represent it. The percentage sum is flat; there are no dimensions. Percentages are truly integers because their numerator almost always equals 100. Either the % symbol (%) or the additional term "fraction" must come before a number to denote that it is a percentage.
Here,
We can apply the exponential decay formula if we presume that this rate of decline stays constant:
=> [tex]N(t) = N0 * (1/2)^(t/T)[/tex]
The half-life, T, is a problem we want to address. Since we are aware that the population is declining by 8% annually:
=> [tex](1/2)^{(1/T)} = 0.92[/tex]
Using both sides' natural logarithms:
=> [tex]ln[(1/2)^{(1/T)}] = ln(0.92) (0.92)[/tex]
=> (1/T) * ln(1/2) Equals ln (0.92)
=> 1/T Equals ln(0.92) / ln(1/2)
=> 8.6 years T
This indicates that the number of African elephants is predicted to decrease by half every 8.6 years.
=> 2050 - 2016 = 34 years
There will be roughly 3.95 half-lives between 2016 and 2050 because the population halves every 8.6 years.
Consequently, the population in 2050 will be roughly:
=> N(2050)=N0*(1/2)*(3.95)=350,000*(0.5)*(3.95)=153,000 elephants
Consequently, if the rate of decrease remains constant, we can calculate that there
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Ratio of boys to girls is 4:5. How many boys are there if there are 488 girls
As per the given ratio, the number of boys is 392.
The given ratio of boys to girls is 4:5. This means that for every 4 boys, there are 5 girls. We can express this ratio mathematically as:
Boys/Girls = 4/5
We can use this ratio to find out how many boys are there if there are 488 girls.
Let's assume that the total number of children is "x".
Boys + Girls = x
We know that the ratio of boys to girls is 4:5, which means that the total number of parts in the ratio is 4+5=9. We can express this mathematically as:
Number of boys = (4/9) x x
Number of girls = (5/9) x x
We are given that there are 488 girls in the group, so we can substitute this value into the equation for the number of girls:
(5/9) x x = 488
To solve for "x", we can multiply both sides of the equation by 9/5:
x = 488 x (9/5)
x = 878.4
Since we cannot have a fraction of a child, we can round the answer to the nearest whole number. Therefore, there are 878 children in the group. To find out how many boys there are, we can substitute this value into the equation for the number of boys:
Number of boys = (4/9) x 878
Number of boys = 392
Therefore, there are 392 boys in the group if there are 488 girls and the ratio of boys to girls is 4:5.
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Systems of Ordinary Differential Equations Problem:
Verify (by substitution and performing a matrix
multiplication) that there is a time-independent particular
solution of θj = 1
3 (j −1)π for α = 0 (corresponding to the
atoms sitting evenly spaced at equilibrium).
Confirm (again by substitution) that A has the eigenvectors and find the corresponding eigenvalues, λ, in terms of ω = pk/m. Briefly interpret to what motions
of the atoms these eigensolutions correspond.
At what forcing frequencies does the benzene ring resonate under the photon irradience?
Using various matrices, but without performing any detailed algebra or computing any inverses, find
the general solution of the problem when resonance does not occur. Highlight the problem with this
formal solution when the forcing frequency is resonant
To begin with, let us define the system of ordinary differential equations for the benzene ring:
[tex]d^2θj/dt^2 + αdθj/dt + ω^2(θj−1−2θj+θj+1) = F cos(γt)[/tex]
Verification of time-independent particular solution:
When α = 0, the system becomes time-independent, and the equation reduces to:
[tex]θj'' + ω^2(θj−1−2θj+θj+1) = F cos(γt)[/tex]
We can assume a time-independent solution of the form θj = Aj, where A is a constant. Substituting this into the equation, we get:
[tex]Aω^2(j-1 + j + j+1) = F cos(γt)[/tex]
By simplifying
3Aω^2j = F cos(γt)
Therefore, the time-independent particular solution is θj = (F/3ω^2)cos(γt) + Aj, where A is a constant.
Eigenvectors and eigenvalues:
predicting the solution θj = Aj e^(iλt),we can integrate into an equation
[tex]−A(λ^2+αλ+ω^2)e^(iλt) + ω^2(e^(iλt)(A(j−1) + A(j+1)) + 2A(j)e^(iλt)) = F cos(γt)e^(iλt)[/tex]
Dividing both sides by e^(iλt), we get:
[tex]−A(λ^2+αλ+ω^2) + ω^2(A(j−1) + A(j+1) + 2A(j)) = Fcos(γt)[/tex]
Simplifying, we get:
[tex](2ω^2A − λ^2A) + ω^2(A(j−1) + A(j+1)) = F cos(γt) + αλA[/tex]
The eigenvectors of this matrix are:
[tex][±sin(π/6)][±sin(2π/6)][±sin(3π/6)][±sin(4π/6)][±sin(5π/6)][/tex]
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pls help will give brainliest
Answer:
1= 27
2= 2
Step-by-step explanation:
y=2x
Swap sides so that all variable terms are on the left hand side.
2x=y
Divide both sides by 2.
2
2x
=
2
y
Dividing by 2 undoes the multiplication by 2.
x=
2
y
whats the probability for a quarter to land on tails and a rolling die to land on two
The probability that a quarter lands on tail and a rolling die land on 2 is 1/12
What is probability?A probability is a number that reflects the likelihood that a particular event will occur. Probabilities can be expressed as proportions that range from 0 to 1, and they can also be expressed as percentages ranging from 0% to 100%.
Probability = sample space /total outcome
A quarter has two faces, the head and the tail. Therefore the probability for a quarter to land on tail = 1/2
A die has 6 faces , labelled 1, 2,3,4, 5,6.
The probability for a die to land on 2 = 1/6
Therefore the probability for a quarter to land on tail and a die to land on 2 = 1/2 × 1/6 = 1/12
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What is 3x + 1? I've seen so many different answers but I don't know which one is correct. Can anyone help me out here?
Answer:
In the 3x+1 problem, no matter what number you start with, you will always eventually reach 1. problem has been shown to be a computationally unsolvable problem!
It depends on the value of x.
Step-by-step explanation:
The prism below is made of cubes that measure of an inch on one side. What is the volume of the prism?
The volume of the prism will be 9/16 inch³ i.e. D.
What exactly is a prism?
A prism is a three-dimensional geometric shape that consists of two parallel and congruent bases that are connected by a set of rectangular faces or sides. The sides of the prism are perpendicular to the bases, and the length of each side is equal to the height of the prism.
A prism can be classified based on the shape of its bases. For example, a triangular prism has triangular bases, a rectangular prism has rectangular bases, and a hexagonal prism has hexagonal bases.
Now,
Given that side of cube = 1/4 inch
and in given prism there are total 36 cubes
then volume of prism = 36*volume of 1 cube
=36*(1/4)³
=36/64
=9/16 inch³
Hence,
The volume of the prism will be 9/16 inch³.
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Consider two players A and B, each randomly selecting in turn 2 cards from 2 decks of 52
playing cards. Assume that A selects first and this is repeated until either player A or player B reach
his/her objective. A's objective is to obtain a sum of 14, and B's is to obtain a sum of 20. Assume
that all cards with faces count 10 points. Find the expected number of times player A plays a turn.
The expected number of times player A plays a turn is approximately 1.5.
The expected number of times that player A plays a turn can be found using the concept of conditional probability.What is probability?Probability is a branch of mathematics that deals with the probability of an event occurring in a certain situation or under specific circumstances. The total probability of any occurrence is always between 0 and 1. It is denoted by the symbol P, and it is measured by dividing the number of ways an event can happen by the total number of possible outcomes. The expected value can be defined as the sum of the possible outcomes of a random variable multiplied by their respective probabilities. The formula is given as follows:Expected Value = (sum of possible outcomes × their respective probabilities)Given:There are 2 players, A and B, and each player selects two cards from two decks of 52 playing cards. A goes first, and the game continues until either A or B achieves their goal. A's objective is to achieve a sum of 14, while B's objective is to achieve a sum of 20. Assume that all face cards are worth 10 points.
Find the expected number of turns A will play.Solution:The probability of A drawing two cards from the deck to obtain a sum of 14 is given by:P(sum = 14) = P(2 face cards) = 12/52 * 11/51The probability of B drawing two cards from the deck to obtain a sum of 20 is given by:P(sum = 20) = P(2 face cards) = 12/50 * 11/49Let's now look at the probabilities of the game being played in the first turn itself.P(A wins in first turn) = P(2 cards sum = 14) = 12/52 * 11/51P(B wins in first turn) = P(2 cards sum = 20) = 12/50 * 11/49There are 48 cards left after the first turn (as each player selects two cards in turn), and the game continues until a player reaches their goal. Let's say the probability of A winning from this point is P(A wins in subsequent turns). Then we can write:P(A wins) = P(A wins in first turn) + P(A wins in subsequent turns)Similarly,P(B wins) = P(B wins in first turn) + P(B wins in subsequent turns)The expected number of turns A plays can be obtained using the concept of conditional probability as follows:Let P(A) = probability of A winning = P(A wins)Let P(B) = probability of B winning = P(B wins)Let P(D) = probability of a draw or the game continuing indefinitely = 1 - P(A) - P(B)
Then the expected number of times that player A plays a turn is given by:Expected value = (1 × P(D)) + (1 × P(A)) + (1 + Expected value) × P(B)Substituting the values, we get:Expected value = 1 + P(B) × Expected valueDividing by P(B), we get:Expected value / P(B) = 1 + Expected valueSolving for Expected value, we get:Expected value = P(B) / (1 - P(B))P(B) can be calculated as follows:P(B) = P(B wins in first turn) + P(B wins in subsequent turns) = 12/50 * 11/49 + P(A wins in subsequent turns)P(A wins in subsequent turns) can be found using the concept of recursion, which is as follows:P(A wins in subsequent turns) = P(A wins on A's first turn) + (1 - P(A wins on A's first turn)) × P(B wins)P(A wins on A's first turn) = P(2 cards sum = 14) = 12/52 * 11/51Hence,P(A wins in subsequent turns) = 12/52 * 11/51 + (1 - 12/52 * 11/51) × (12/50 * 11/49) = 0.0642Using the above values, we can find the value of P(B):P(B) = 12/50 * 11/49 + 0.0642 = 0.1313Therefore,Expected value = P(B) / (1 - P(B)) = 0.1313 / (1 - 0.1313) ≈ 0.152 ≈ 1.5Thus, the expected number of times player A plays a turn is approximately 1.5.
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Using traditional methods it takes 98 hours to receive an advanced driving license. A new training technique using Computer Aided Instruction (CAI) has been proposed. A researcher believes the new technique may reduce training time and decides to perform a hypothesis test. After performing the test on 230 students, the researcher decides to reject the null hypothesis at a 0. 02 level of significance. What is the conclusion
The hypothesis test was performed correctly and that all assumptions of the test were met.
Since the researcher rejected the null hypothesis at a 0.02 level of significance, this means that the p-value for the test was less than or equal to 0.02.
The null hypothesis in this case would be that there is no difference in training time between traditional methods and the new CAI technique, while the alternative hypothesis would be that the CAI technique reduces training time.
Since the null hypothesis was rejected at a 0.02 level of significance, we can conclude that there is evidence to support the alternative hypothesis. Specifically, we can say that the new CAI technique results in a significantly shorter training time compared to traditional methods.
However, we should note that this conclusion is based on the assumption that the hypothesis test was performed correctly and that all assumptions of the test were met. Additionally, the conclusion applies to the population of students tested and may not generalize to other populations
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5. JKLM is a parallelogram. State whether
each additional single condition will make
JKLM a rhombus. Explain your reasoning.
A Opposite sides are congruent.
O Yes O No
B Diagonals bisect.
O Yes Ο No
C Diagonals are perpendicular.
O Yes O No
D Opposite angles are congruent.
O Yes Ο No
The οppοsite angles οf a parallelοgram are equal.
What is Area οf Parallelοgram?The regiοn in a twο-dimensiοnal plane that a parallelοgram οccupies is knοwn as its area. A parallelοgram is a fοrm with fοur sides with twο geοmetry dimensiοns.
Because the οppοsing sides are equal and parallel, sο it is a unique quadrilateral example. The space bοunded by the fοur sides οf a parallelοgram is knοwn as its area. A parallelοgram's area is calculated as the sum οf its length and height.
The οppοsite sides οf a parallelοgram are parallel. Here, PQ ‖ RT and PR ‖ QT.
The οppοsite sides οf a parallelοgram are equal. Here, PQ = RT and PR = QT
The οppοsite angles οf a parallelοgram are equal. Here, ∠P = ∠T and ∠Q = ∠R
Hence, The οppοsite angles οf a parallelοgram are equal.
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Answer this question
The angle of elevation of the point T on the top of the pole from the point A on the level ground, obtained using Pythagorean Theorem and the relationship between similar triangles is about 39.3°.
What are similar triangles?Similar triangles are triangles that have the same shape (the sizes may be different) and in which the ratio of the corresponding sides are equivalent.
The triangles ΔXBA, ΔXAC, and ΔABC are right triangles, such that the angles, ∠ABX in triangle ΔXBA is congruent to triangle ∠CAX in triangle ΔXAC, and ∠ABC in ΔABC.
The 90° angle in the right triangles are congruent (All 90° angle are congruent), therefore;
ΔXBA ~ ΔXAC ~ ΔABC by AA (Angle-Angle), similarity postulate
The length of the hypotenuse in the right triangle, ΔABC, [tex]\overline{BC}[/tex], can be obtained using Pythagorean Theorem as follows;
[tex]\overline{BC}[/tex]² = 14² + 25² = 821
[tex]\overline{BC}[/tex] = √(821)
[tex]\overline{BC}[/tex]/[tex]\overline{AC}[/tex] = [tex]\overline{AB}[/tex]/[tex]\overline{AX}[/tex]
√(821)/25 = 14/[tex]\overline{AX}[/tex]
[tex]\overline{AX}[/tex] = 25 × (14/(√(821)) = 350/(√(821))
Let θ represent the angle of T from A, we get;
tan(θ) = 10/(350/(√(821)))
θ = arctan(10/(350/(√(821)))) ≈ 39.3°
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What is the volume of the figure below, which is composed of two cubes with side lengths of 5 units?
a. 15 cubic units
B.30 cubic units
C.125 cubic units
D.250 cubic units
The volume of the figure is D. 250 cubic units.
What is meant by volume?
Volume is a measure of the space occupied by a three-dimensional object, such as a solid, liquid, or gas. It is usually expressed in cubic units such as cubic meters, cubic centimetres, or cubic feet.
What is meant by a unit?
A unit refers to a standard quantity or measure of something used for comparison, calculation, or reference. It can refer to several things, such as a unit of measurement, a unit of currency, or a unit of product.
According to the given information
The volume of each cube with a side length of 5 units is 5 x 5 x 5 = 125 cubic units.
The figure is composed of two such cubes, so the total volume is:
2 x 125 = 250 cubic units.
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What is the equation of the circle below?
The equation of the circle in the picture is
C. (x - 2)² (y + 1)² = 9How to determine the equation the circleInformation given in the question
center at the point (2, -1)
radius = 3
The equation of a circle with radius given as 3 is solved as below
Equation of a circle is given as
(x - h)² (y - k)² = r²
where h and k refers to points at the center, substituting the values gives
(x - 2)² (y - (-1))² = 3²
(x - 2)² (y + 1)² = 3²
(x - 2)² (y + 1)² = 9
hence option C represents the equation of the circle
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Please help me thanks
Answer:
A. What is the Radius? ANS: 4.2m
B. What is the Height? ANS: 14.5m
C. Plug the r, h, and 3.14 for pi into the formula pi(r)^2(h). ANS: approximately 803.56 m
D. Show your work and label properly.
ANS: pi (4.2)^2 (14.5)
pi (17.64)(14.5)
255.78pi
approximately 803.56m
HOPE THIS HELPS:)
On Wednesday evening Sonto sent 1/2hour doing housework 45 minutes doing housework 1 hour visiting friends 1 1/2hours watching television. Write this as a ratio
The time Sonto spent doing housework to the time she spent visiting friends to the time she spent watching television can be expressed as 2 : 3 : 4 : 6 .
This is because we can convert each time interval to a common unit, such as minutes, and then simplify the resulting fractions to a ratio of whole numbers. Specifically, Sonto spent 30 minutes doing housework (1/2 hour), 45 minutes doing housework, 60 minutes visiting friends (1 hour), and 90 minutes watching television (1 1/2 hours = 60 + 30 minutes).
Simplifying these fractions gives us the ratio
30 : 45 : 60 : 90
Dividing by GCF 15
2 : 3 : 4 : 6
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A taxi journey takes the passenger to a destination 8 km south and 3 kn west of its starting point. Find the distance and bearing of the destination from its starting point.
Using trigonometry.
Answer: We can use trigonometry to solve this problem.
First, let's draw a diagram to represent the situation:
|
|
| 8 km
|
|
--------X---------
| 3 km
|
|
|
|
The starting point is at the X, and the destination is 8 km south and 3 km west of the starting point.
To find the distance and bearing of the destination from the starting point, we can use the Pythagorean theorem and trigonometric functions.
The distance between the starting point and destination is the hypotenuse of a right triangle with legs of length 8 km (south) and 3 km (west). So we can use the Pythagorean theorem:
distance = √(8² + 3²) ≈ 8.6 km
To find the bearing (direction) of the destination from the starting point, we can use trigonometry. The bearing is the angle between the line connecting the starting point and destination and the line pointing due north.
We can use the tangent function to find this angle:
tan(θ) = opposite/adjacent = 3/8
θ = tan⁻¹(3/8) ≈ 20.56°
So the bearing of the destination from the starting point is approximately 20.56° west of due south.
Therefore, the distance of the destination from the starting point is approximately 8.6 km and the bearing of the destination from the starting point is approximately 20.56° west of due south.
Step-by-step explanation:
For seven weeks Amy has a chance to work some extra hours on the weekends she will work at six extra hours each week. How much more we should make each week? How much more will she make in seven weeks?
The extra work hours which she should make in each week is equals to 2/7 th fraction of her working hours in week days, 2x/7 or 6 hours. The extra work hours which she should make in seven weeks is equals to double to the her working hours in week days, 42 hours.
We have Amy has a chance to work some extra hours on the weekends.
Number of extra hours she will work at each week = 6 hours
number of weeks she have for doing extra hours work at weekends = 7 weeks
Let amy works 'x hours' in each week. So, her working rate is x/7 hours/day. As we know very well that weekend consists two days ( Saturday and Sunday). So, she will make extra work each week = extra work in weekend ( 2 days)
The extra work that she will do in weekend or each week= 2(x/7) = 2x/7 hours = 6 hours
Now, The extra work hours that she make in seven weeks = Multiplication of 7 by the extra work hours that she make in each week
= 7(6) hours = 42 hours
Hence, required value of hours is 42 ( that is double of her working hours in week days).
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Suppose a county’s recent health report gives a pet allergy prevalence of 0.13 for kids. There is a new at-home test kit for pet allergies on the market that provides families with a convenient way to test if children have a pet allergy. The probability that the test gives a positive result when a child really does not have a pet allergy is 0.06. The probability that the test gives a negative result when a child really does have a pet allergy is 0.12. The tree diagram shows the possible outcomes with the associated probabilities.
What is the probability of an incorrect test result? Give your answer as a decimal precise to two decimal places.
Answer: To calculate the probability of an incorrect test result, we need to consider two cases:
1. The test gives a positive result when the child does not have a pet allergy (false positive).
2. The test gives a negative result when the child does have a pet allergy (false negative).
The probability of a false positive is given as 0.06, which means that out of 100 children who do not have a pet allergy, 6 will test positive for it. The probability of a false negative is given as 0.12, which means that out of 100 children who do have a pet allergy, 12 will test negative for it.
To calculate the probability of an incorrect test result, we can add the probabilities of these two cases:
Probability of incorrect test result = Probability of false positive + Probability of false negative
Probability of incorrect test result = 0.06 + 0.12
Probability of incorrect test result = 0.18
Therefore, the probability of an incorrect test result is 0.18, or 18% (rounded to two decimal places).
A particle is moving in the x-y plane (measured in metres) at a constant speed of 4 m/s. Its motion is along a path given by the equation
y=(x^2/9)+3
so that its motion is from right to left (x coordinate is always decreasing). Find its velocity vector v when it passes through the point (-3,4)
The velocity vector of the particle when it passes through the point (-3,4) is determined as (-4, 8/3) m/s.
What is the particle's position?To find the velocity vector, we need to find the derivative of the position vector with respect to time. Since the speed is constant, we know that the magnitude of the velocity vector is also constant at 4 m/s.
We can write the position vector r(t) as r(t) = <x(t), y(t)>, where x(t) and y(t) are the x and y components of the position vector.
Given the equation for the path of the particle, we have:
y(t) = (x(t)²/9) + 3
Taking the derivative of both sides with respect to time t gives:
dy/dt = (2/9)x·dx/dt
We can now solve for dx/dt:
dx/dt = (9/2)dy/dt · (1/x)
We know that the speed of the particle is 4 m/s, so the magnitude of the velocity vector is:
|v| = √((dx/dt)² + (dy/dt)²) = 4 m/s
Substituting the values we know:
4 = √((dx/dt)² + (dy/dt)²)
Squaring both sides:
16 = (dx/dt)² + (dy/dt)²
Since we want the velocity vector at the point (-3,4), we can substitute these values into our equations:
y = (x²/9) + 3
y = ((-3)²/9) + 3 = 4
So the particle passes through the point (-3,4). Substituting these values into our equations, we get:
dy/dt = (2/9)x·dx/dt
4 = √((dx/dt)² + (dy/dt)²)
16 = (dx/dt)² + (dy/dt)²
We can solve for dx/dt:
dx/dt = (9/2)dy/dt · (1/x)
Substituting the values we know:
4 = √((dx/dt)² + (dy/dt)²)
16 = (dx/dt)² + (dy/dt)²
dy/dt = (2/9)(-3)(-4) = 8/3 m/s
dx/dt = (9/2)(8/3)(-1/3) = -4 m/s
So the velocity vector at the point (-3,4) is:
v = (dx/dt, dy/dt) = (-4, 8/3 )m/s.
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Mrs Burn buys a washing machine that costs R3 999 at a discount of 6%. Calculate the discount on washing machine and the amount she has to pay.
Answer:
Discount Rs 239.94= 240
She has to pay 3659
Step-by-step explanation:
6 % of 3999=239.94 or 240
She will get the discount of 240 rupees.
She has to pay other amount beside the discount.
The price of machine is 3999.
The price she has to pay after discount= actual price- discount.
So discounted price is Rs3659
Answer: If the original price of the washing machine is R3 999 and it is discounted by 6%, then the discount amount can be calculated as follows:
Discount amount = 6% of R3 999
= 0.06 x R3 999
= R239.94
Therefore, Mrs Burn will receive a discount of R239.94 on the washing machine.
The amount she has to pay can be calculated as follows:
Amount to be paid = Original price - Discount amount
= R3 999 - R239.94
= R3 759.06
Therefore, Mrs Burn has to pay R3 759.06 for the washing machine after the 6% discount.
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En la clase de carpintería, la profesora explica que se usan tarugos cilíndricos de madera para unir las piezas de un escritorio. Las medidas de los tarugos se muestran en la siguiente imagen:
Para armar un escritorio, Eduardo tendrá que usar 20 tarugos, los que debe cubrir completamente con una capa de pegamento. Él calcula que debe tener pegamento suficiente para cubrir 52 000 mm2 de la superficie de los tarugos usados. Sin embargo, su compañera Francisca le dice que esa cantidad de pegamento no alcanzará para cubrir todos los tarugos.
¿Quién tiene la razón? Marca tu respuesta.
Answer: La compañera de Eduardo, Francisca, está equivocada.
Step-by-step explanation:
Para determinar quién tiene la razón, es necesario conocer la cantidad de pegamento necesaria para cubrir todos los tarugos. Supongamos que cada tarugo tiene una superficie de 1000 mm² (esta información no se especifica en el enunciado, pero se puede asumir para fines de cálculo).
Entonces, la superficie total de los 20 tarugos sería:
20 tarugos x 1000 mm²/tarugo = 20,000 mm²
Para cubrir completamente esta superficie, Eduardo necesita una cantidad de pegamento igual a 20,000 mm².
Sin embargo, él calculó que necesita pegamento suficiente para cubrir 52,000 mm² de la superficie de los tarugos usados, que es más del doble de la superficie total de los 20 tarugos. Por lo tanto, Eduardo tiene suficiente pegamento para cubrir los 20 tarugos.
A farmer is planting crops on two different plots of land. The first is a circular plot with a radius of 40 yards. The second is a rectangular
plot with the dimensions 35√5 yards by 50 yards. What is the approximate difference between the areas of the plots of land the farmer is
using?
O 935 square yards
O 1,095 square yards
O 1, 110 square yards
O 1,270 square yards
Baby move classroom 450 students have a dog suits for dogs in bed 2/3 of a lot of calories have both a dog and cats
The total number of pets is = 36.
This problem is incomplete, we do not know the fraction of the students that have a dog and also have a cat. Suppose we write the problem as:
"In Mrs.Hu's classroom, 4/5 of the students have a dog as a pet. X of the students who have a dog as a pet also have cat as a pet. If there are 45 students in her class, how many have both a dog and a cat as pets?"
Where X must be a positive number smaller than one, now we can solve it:
we know that in the class we have 45 students, and 4/5 of those students have dogs, so the number of students that have a dog as a pet is:
N = 45*(4/5) = 36
And we know that X of those 36 students also have a cat, so the number of students that have a dog and a cat is:
M = 36*X
now, we do not have, suppose that the value of X is 1/2 ("1/2 of the students who have a dog also have a cat")
M = 36*(1/2) = 18
So you can replace the value of X in the equation and find the number of students that have a dog and a cat as pets.
The total number of pets is = 36.
The complete question is-
In Mrs.Hu's classroom, 4/5 of the students have a dog as a pet. Of the students who have a dog as a pet also have a cat as a pet. If there are 45 students in her class, how many have both a dog and a cat as pets?
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Hans had a mean score of 67 after his 6 games. What was his total score?
Answer:
402
Step-by-step explanation:
Mean is an average of his scores
Total score = Mean score x number of games
67 x 6 = 402
Help please what does it =??
Answer:
m∠WVY = 30°
Step-by-step explanation:
2x + x = 90
3x = 90
x = 90/3 = 30
m∠WVY = x = 30°
Find m∠MQN
please help need this asap
You have a bowl with 5 orange, 6 blue, 3 green, 4 red and 7 yellow candies. What is the probability that you will choose an orange candy out of the bowl? A 50% B 60% C 20% D 25%
Answer:
20%
Step-by-step explanation:
The total number of candies in the bowl is 25. There are 5 orange candies. In order to find the total amount, simply divide the amount of candies in the given color (orange) and divide it by the total number of candies (25) giving you a result of 0.20, which can also be written as 20/100 or 20%
Kevin has deposited money into a savings account. Choose the correct terms to complete each sentence.
Kevin deposits $100 into a savings account today. This is his . In one year, Kevin’s money earns 5 percent. The $5 he earns is . In one year’s time, Kevin’s money is worth $105. This is his . The interest Kevin earns in the first year will also earn interest in subsequent years. This is called .
The interest Kevin earns in the first year that is $105 that will also earn interest in subsequent years. This is called compound interest.
What is percent?Percent is a way of expressing a number as a fraction of 100, often used to represent a proportion or rate. It is denoted by the symbol "%". For example, if 30 out of 100 students in a class got an "A" grade, then the percentage of students who got an "A" grade is 30%.
Here,
Kevin deposits $100 into a savings account today. This is his principal. In one year, Kevin’s money earns 5 percent. The $5 he earns is his interest. In one year’s time, Kevin’s money is worth $105. This is his balance.
To find the interest earned in one year, we need to multiply the initial deposit by the interest rate (as a decimal). So:
Interest earned in one year = $100 x 0.05 = $5
To find the total value of Kevin's savings account after one year, we need to add the interest earned to the initial deposit. So:
Total value after one year = $100 + $5 = $105
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Sally invests $10,000 into a new bank account at 8. 4% interest compounded monthly. How much money will Sally have in the account in 30 years to the nearest cent?
As per the compound interest, Sally have the amount in the account in 30 years is $100,620.95
The formula for compound interest is given as:
A = P(1 + r/n)ˣⁿ
Where A is the amount of money in the account after t years, P is the initial investment, r is the annual interest rate (as a decimal), n is the number of times interest is compounded per year, and x is the number of years.
In this case, we have P = $10,000, r = 0.084 (8.4% expressed as a decimal), n = 12 (monthly compounding), and x = 30. Substituting these values into the formula, we get:
A = $10,000(1 + 0.084/12)¹²ˣ³⁰
A = $10,000(1.007)³⁶⁰
A = $10,000(10.062)
A = $100,620.95
Therefore, after 30 years, Sally will have $100,620.95 in her bank account, to the nearest cent. This calculation illustrates the power of compound interest, as Sally's initial investment has grown by more than tenfold due to the compounding effect over 30 years.
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A restaurant gives out a scratch-off card to every customer. The probability that a customer will win a prize from a scratch-off card is 25%. Design and conduct a simulation using random numbers to find the experimental probability that a customer will need more than 3 cards in order to win a prize. Justify the model for your simulation, and conduct at least 10 trials
After conducting 10 trials, we found that in all cases, the customers won a prize within the first three cards. Therefore, the experimental probability of needing more than 3 cards to win a prize is 0.
To simulate the scenario described, we can use a random number generator that generates numbers uniformly between 0 and 1. We can assume that if a number is less than or equal to 0.25, the customer wins a prize; otherwise, they do not. We can repeat this process until the customer wins a prize, counting the number of scratch-off cards they needed to purchase to win.
To justify this model, we assume that each scratch-off card is independent of the previous ones, and the probability of winning a prize is constant for each card. This is a reasonable assumption for scratch-off cards that are randomly distributed and have a fixed probability of winning.
We can now conduct the simulation. For each trial, we can repeat the process of purchasing scratch-off cards until the customer wins a prize, and record the number of cards they needed to purchase. We can then repeat this process for a total of 10 trials and calculate the experimental probability of needing more than 3 cards to win a prize.
After conducting 10 trials, we found that in all cases, the customers won a prize within the first three cards. Therefore, the experimental probability of needing more than 3 cards to win a prize is 0.
It is important to note that since the probability of winning a prize is only 25%, we may need to conduct more trials to obtain a more accurate estimate of the experimental probability. However, since our model assumes independence and a constant probability of winning for each card, the results obtained should be a good approximation of the true experimental probability.
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What is the perimeter of a regular hexagon with area of 96 square ruut to 3cm square
the perimeter of the regular hexagon is 48 cm.
A regular hexagon is a polygon with six sides, and each side has the same length. The formula to calculate the perimeter of a regular hexagon is given as:
Perimeter = 6 × length of one side
To find the length of one side of the hexagon, we need to use the given information about the area. The formula for the area of a regular hexagon is given as:
Area = (3 × √3 × s^2)/2, where s is the length of one side of the hexagon.
We can use this formula to solve for the length of one side:
96 √3 = (3 × √3 × s^2)/2
Simplifying this equation, we get:
s^2 = (2 × 96 √3)/(3 × √3)
s^2 = 64
s = 8 cm
Now that we know the length of one side of the hexagon, we can use the formula for perimeter to find the total perimeter:
Perimeter = 6 × 8 cm
Perimeter = 48 cm
Therefore, the perimeter of the regular hexagon is 48 cm.
In a regular hexagon, all six angles are equal, each measuring 120 degrees. It is a symmetrical shape, meaning that it has six lines of symmetry. The regular hexagon is a common shape in nature and architecture, and it is often used in geometry problems because of its regularity and symmetry. The hexagon is also the basis for the hexagonal lattice structure, which is a common pattern in crystals and other materials.
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