(a) 0, 1/2, 3/8.
(b) The conditional probability distribution of X is 1/3.
(c) the expected value of Y is 0.
(d) Yes, X and Y are independent.
What is Joint distribution?
Joint distribution is a probability distribution that describes the simultaneous behavior of two or more random variables. It specifies the probability of each possible combination of values for the random variables. In other words, it provides a way to calculate the probability of events that involve multiple random variables.
(a) To find the probabilities P(X < 0.5, Y < 1.5), P(X > 0.25, Y < 4.5), and P(X ≤ 0.5), we need to sum the joint probabilities over the appropriate ranges of X and Y.
P(X < 0.5, Y < 1.5) = p(-1,-2) + p(-1,0) + p(-1,1) + p(0,-2) + p(0,0) + p(0,1) = 0
P(X > 0.25, Y < 4.5) = p(1,-2) + p(1,0) + p(1,1) + p(1,2) + p(2,-2) + p(2,0) + p(2,1) + p(2,2) = 1/2
P(X ≤ 0.5) = p(-1,-2) + p(-1,0) + p(-1,1) + p(0,-2) + p(0,0) + p(0,1) + p(0,2) + p(1,-2) + p(1,0) + p(1,1) = 3/8
(b) The conditional probability distribution of X given that Y = 1 can be found by dividing the joint probabilities by the marginal probability of Y = 1:
P(X = -1 | Y = 1) = p(-1,1) / ∑ p(-1,y) = 1/3
P(X = 0 | Y = 1) = p(0,1) / ∑ p(0,y) = 1/3
P(X = 1 | Y = 1) = p(1,1) / ∑ p(1,y) = 1/3
Therefore, the conditional probability distribution of X given that Y = 1 is:
X | P(X|Y=1)
--- | --------
-1 | 1/3
0 | 1/3
1 | 1/3
(c) To find E(Y), we need to sum the product of Y and its probability over all possible values of Y:
E(Y) = ∑ y p(x,y)
E(Y) = (-2)(1/8) + (-1)(1/4) + (0)(1/8) + (1)(1/4) + (2)(1/8) = 0
(d) To determine if X and Y are independent, we need to check if the joint distribution can be expressed as the product of the marginal distributions:
p(x,y) = p(x) * p(y)
We can find the marginal distributions by summing the joint probabilities over the appropriate values of X or Y:
p(x) = ∑ p(x,y)
p(-1) = p(-1,-2) + p(-1,0) + p(-1,1) = 1/4
p(0) = p(-1,0) + p(0,-2) + p(0,0) + p(0,1) = 1/2
p(1) = p(1,-2) + p(1,0) + p(1,1) + p(1,2) = 1/4
p(y) = ∑ p(x,y)
p(-2) = p(-1,-2) + p(1,-2)
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Find the slope from A ( 2, 4) to B (-4, 0).
Slope of AB: m =
Step-by-step explanation:
Slope is y2 - y1 / x2 - x1
X1 =2 y1 =4 x2 =-4 y2= 0
0 - 4/ - 4 - 2 = - 4/-6
Sslope =2/3 or 0.67
Round it up if you are asked to.
I NEED HELPP FAST!!!
Evaluate 3^-2.
A. -1/9
B. 1/9
C. 1
D. -6
Answer:
[tex] \frac{1}{9} [/tex]
Step-by-step explanation:
Deal with negative and numerical exponents separately;
Negative exponent means reciprocal;
2 means sqared;
So:
[tex] {3}^{2} = 9 \\ {3}^{ - 2} = \frac{1}{9} [/tex]
An invasive species of carp is introduced to Lake Freshwater. Initially there are 100 carp in the lake and the population varies by 20 fish seasonally. If by year 5 , there are 625 carp, find a function modeling the population of carp with respect to t , the number of years from now
modeling function the population of carp with respect to time is: P(t) = 100 * [tex]e^{0.707t}[/tex]
To model the population of carp with respect to time, we can use the following exponential growth formula:
P(t) = P(0) * [tex]e^{rt}[/tex]
where P(0) is the initial population, r is the annual growth rate, and t is the number of years from now.
We know that initially there are 100 carp in the lake, so P(0) = 100.
We also know that the population varies by 20 fish seasonally, so the annual growth rate is:
r = ln(625/100) / 5 = 0.707
Thus, the function modeling the population of carp with respect to time is:
P(t) = 100 * [tex]e^{0.707t}[/tex]
where t is the number of years from now.
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The interior angles formed by the sides of a quadrilateral have
measures that sum to 360°,
What is the value of x?
Enter your answer in the box.
(3x-6)
88
2x
108
Answer:
X = 34
Step-by-step explanation:
360-108 = 252
252-88 = 164
5x-6
164+6 = 170
170/5 = 34
lines r and s are parallel, meaning they will never intersect. Draw similar slope triangles on each line and find the slope of each line.What conclusion can you draw about the slopes of parallel lines?
If two lines have the same slope, it means that they have the same steepness or inclination and will never intersect, no matter how far they are extended in either direction.
What are parallel lines?Parallel lines are two or more lines in a two-dimensional plane that never intersect, regardless of how far they are extended in either direction. In other words, they have the same direction or slope but different y-intercepts.
What are the fundamental principles of parallel lines?They never intersect: Parallel lines are two or more lines in a two-dimensional plane that never intersect, regardless of how far they are extended in either direction.Same slope or direction: Parallel lines have the same slope or direction but different y-intercepts.Equidistant: Parallel lines remain equidistant from each other at all points.Transversal: When a transversal line intersects two parallel lines, the corresponding angles are congruent, the alternate interior angles are congruent, and the alternate exterior angles are congruent.In the given Question,
To draw similar slope triangles on each line, we can choose any two points on the line and connect them with a straight line segment. Then, we can calculate the rise (change in y) and run (change in x) between the two points and use these values to determine the slope of the line using the formula:
slope = rise / run
If we draw similar slope triangles on both parallel lines r and s, we will find that the ratios of the rise to the run are equal for both lines. This means that the slopes of the two lines are equal, and we can express this mathematically as:
slope_r = slope_s
This relationship between the slopes of parallel lines is important in many applications of mathematics, including geometry, trigonometry, and calculus.
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Beverly has a bag of marbles that weighs 30 grams. She knows that each marble weighs 1.5 grams and the bag weighs 1.5 grams. Which equation could she use to determine how many marbles are in the bag? Select all that apply. (1.5)x + 1.5 = 30 30 – x = 2(1.5) (1.5)(30) = 1.5x 1.5 + x = 30 1.5x = 30 – 1.5
Answer:
(1.5)x + 1.5 = 30
Step-by-step explanation:
Ashley bought stock in a company two years ago that was worth x dollars. During the first years that she owned the stock it decreased by 7%. During the second year the value of the stock decreased by 23%. Wrote an expression in terms of x that represents the value of the stock after two years
After answering the presented question, we can conclude that As a result, the equation that reflects the stock's value after two years in terms of x is: 0.7161x
What is equation?An equation is a mathematical statement that proves the equality of two expressions connected by the equal symbol '='. 2x - 5 Equals 13, for example. Expressions include 2x-5 and 13. The character '=' joins the two expressions. A mathematical formula with two algebraic expressions on either side of an equal sign (=) is known as an equation. It demonstrates the relationship of equivalence between the left and right formulas. In every formula, LHS = RHS (left side = right side).
Because the stock's value fell by 7% after the first year, it is now worth:
x - 0.07x = 0.93x
The stock's value dropped by 23% after the second year, therefore it would be worth:
0.93x - 0.23(0.93x) = 0.93x - 0.2139x = 0.7161x
As a result, the expression that reflects the stock's value after two years in terms of x is:
0.7161x
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PLEASE HELP WILL GIVE BRAINLIEST
Answer:
Uhm i think its ABD weeweee
Step-by-step explanation:
Because monkeys wooowooo not weewee so the commentary would be weeeweee
A quantity with an initial value of 3600 decays
exponentially at a rate of 1% every 8 days.
What is the value of the quantity after 7 weeks,
to the nearest hundredth?
To the nearest tenth, the quantity of the amount after [tex]7[/tex] weeks is around [tex]1804.74[/tex].
What does, for instance, amount mean?Quantity simply refers to how much or how many of anything there are. A quantity can also be an amount, a number, or a measurement. It responds to the "how much?" query. Numbers may also be used to understand quantities, such as this book has 55 pages, this container has 'x' quantities of black pens, etc.
What do numbers in amounts mean?Numbers can be used to express quantities, such as 55 pages or reading. Entire numbers, fractions, fractions, percentages, or units of measurement like space, money, length, or weight can all be used to express these values. Quantities may also be stated using uncommon units.
[tex]A_{0} = 3600[/tex]
[tex]r = 0.01[/tex] (since the rate of decay is [tex]1[/tex]%)
[tex]t = 7[/tex] weeks [tex]= 56[/tex] days (since there are [tex]7[/tex] days in a week)
We can first find the value of [tex]e^{-rt}[/tex] as follows:
[tex]e^{-rt} = e^{-0.0187} = 0.5013[/tex]
Substituting into the formula, we have:
[tex]A = 3600 * 0.5013 ≈ 1804.74[/tex]
Therefore, the value of the quantity after [tex]7[/tex] weeks, to the nearest hundredth, is approximately [tex]1804.74[/tex].
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Zack wheeler had a war of 7. 8 in the 2021 season what does this mean
Zack wheeler had a war of 7. 8 in the 2021 season this means that He scored an average of 7.8 runs per game.
This means that Zack scored an average 7.8 runs per game.
An average is a single number represented as a list of numbers, usually the sum of the numbers divided by the number of numbers in the list (arithmetic mean). For example, the numbers 2, 3, 4, 7, and 9 (for a total of 25) have an average of 5. Depending on the context, the average can be another statistic, such as the median or the mode. Average personal income, for example, is often given as the median – a figure below 50% of personal income and above 50% of personal income – because the average would be higher if some personal income of billionaires were included. Therefore, it is recommended to avoid using the word "average" when referring to measures of central tendency.
Complete Question:
Zack Wheeler had a WAR of 7.8 in the 2021 season. What does this mean?
A. He scored an average of 7.8 runs per game.
B. His team won an average of 7.8 more games than other teams in MLB.
C. His team won around 7.8 more games than it would have with a replacement player.
D. He scored around 7.8 more runs than a replacement player would have.
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A recent article in a national newspaper claimed that 40% of all students in US colleges drink some alcoholic beverages at least once a week. A students association argued that actually fewer students arink alcohol. In support of its claim the student association has sampled at random 500 students and found that only 180 of them stated that they do drink at least once a week. What is the (claimed) population proportion of students who drink at least once a week? p= By the CLT the distribution of the sample proportion p is the normal distribution with Mean: μ j =p and standard deviation σ j = n pq . Caiculate the values of these parameter assuming that the claimed population proportion in (a) is correct, μ p = and σ 5 = c) Calculate the (observed) sample proportion of those who said "Yes" (that they do drink at least once a week). p ^ 0 = 500 180 =0.36 p ˙ at = n x =0.36 d) Use the CLT and (b) to find the probability to observe such, or smaller, sample proportion if the claim in (a) were to be correct. Pr( p ≤ P ^ ade )= e) is the result in (d) supports or refutes the claim in (a)? Why?
Result in (d) refutes the claim in (a), since it is less than the 5% level of significance. Actual proportion is lower than 0.4.
A recent article in a national newspaper claimed that 40% of all students in US colleges drink some alcoholic beverages at least once a week. A students association argued that actually fewer students drink alcohol. In support of its claim the student association has sampled at random 500 students and found that only 180 of them stated that they do drink at least once a week.
Calculate the Claimed Population Proportion
The claimed population proportion is p=0.4
Calculate the Parameters for the Normal Distribution of Sample Proportion
By the Central Limit Theorem, the distribution of the sample proportion p is the normal distribution with mean μj=p=0.4 and standard deviation σj=npq= √[(0.4)(0.6)/500]=0.047.
Calculate the Observed Sample Proportion
The observed sample proportion of those who said "Yes" (that they do drink at least once a week) is pˆ0=500/180=0.36.
Calculate the Probability to Observe Such, or Smaller, Sample Proportion if the Claim in (a) Were to be Correct
Using the CLT and the parameters in (b), the probability to observe such, or smaller, sample proportion if the claim in (a) were to be correct is Pr(p≤pˆ0)=0.056.
Conclusion
The result in (d) refutes the claim in (a), since it is less than the 5% level of significance. This means that we reject the null hypothesis that the proportion of students drinking at least once a week is 0.4, and instead conclude that the actual proportion is lower than 0.4.
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One card is drawn from a standard deck of 52 playing cards. Find the probability of each of the following events: 1. A spade is drawn. 2. A seven is drawn. 3. A spade or heart is drawn. 4. A black jack is drawn.
1. 25%
2. 7.69%
3. 50%
4. 0.46%
1. The probability of drawing a spade is 1/4, or 25%.
2. The probability of drawing a seven is 4/52, or 7.69%.
3. The probability of drawing a spade or heart is 1/2, or 50%.
4. The probability of drawing a black jack is 1/216, or 0.46%.
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f(x) = log1/g 7; translation 8 units right followed by a vertical stretch by a factor of 5
Thus, the resulting function after an 8 unit right translation and a 5-unit vertical stretch is obtained as: f(x) = 5* log1/7(x+8)
Explain about the translation?Any applied either a horizontal or vertical shift to an object is referred to as a translation in geometry. In geometry, a translation is a displacement that occurs either horizontally to the left but rather right or straight up or down. It may also consist of a mix of the two.
The simplest technique to modify a geometric object is to identify its main points and translate those. By "connecting the dots," you can then finish the object.
The stated function:
f(x) = log1/7x
translation 8 units right will give (x + 8)
Function : f(x) = log1/7(x+8)
Now, vertical stretch by a factor of 5.
Function : f(x) = 5* log1/7(x+8)
Thus, the resulting function after an 8 unit right translation and a 5-unit vertical stretch is obtained as: f(x) = 5* log1/7(x+8)
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The correct question is-
f(x) = log1/7x ; translation 8 units right followed by a vertical stretch by a factor of 5. The resultant function will be?
An airplane can fly with either one engine or both. Each engine has a 0.21 chance of failing. What is the probability that during a 10-hour flight the plane will fail to reach its intended destination or crash?
The probability that during a 10-hour flight an airplane will fail to reach its intended destination or crash is
To solve this problem, we can use the binomial distribution, which gives the probability of k successes in n independent trials, each with the same probability of success p. In this case, a "success" is defined as the engine not failing, and a "failure" is defined as the engine failing.
Let X be the number of engines that fail during the flight. Since each engine can fail independently of the other engine, X follows a binomial distribution with n = 2 (the number of engines) and p = 0.21 (the probability of a single engine failing). The probability of X failures is:
P(X = 0) + P(X = 1) + P(X = 2)
where P(X = k) = (n choose k) * p^k * (1 - p)^(n - k), and (n choose k) is the binomial coefficient.
Using this formula, we can calculate the probability of each possible value of X and add them up:
P(X = 0) = (2 choose 0) * 0.21⁰* 0.79²= 0.6241
P(X = 1) = (2 choose 1) * 0.21¹* 0.79¹= 0.32994
P(X = 2) = (2 choose 2) * 0.21² * 0.79⁰ = 0.04689
Therefore, the probability of the plane failing to reach its intended destination or crashing is:
P(X >= 1) = P(X = 1) + P(X = 2) = 0.32994 + 0.04689 = 0.37683
So the probability of the plane not making it to its destination is about 37.7%.
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Write an exponential function that passes through (0,3) and (1,6). Write your answer in the form f(x) = ab^x
Answer:
[tex]\boxed{f(x)=(3)(2)^x}[/tex]
Step-by-step explanation:
First, we need to substitute the coordinates of the two given points in the ecuation [tex]f(x)=ab^x[/tex]:
[tex]3=ab^{0} \qquad \textbf{ec.1}\\6=ab^{1} \qquad \textbf{ec.2}[/tex]
Remember that any number raised to the power 0 is equal to 1. So:
[tex]3=a \qquad \textbf{ec.3}[/tex]
now, we can substitute in ec.2 and solve for b:
[tex]6=3b\\ b=2[/tex]
Finally:
[tex]f(x)=(3)(2)^x[/tex]
Therefore, we have found the solution to the exercise
[tex]\text{-B$\mathfrak{randon}$VN}[/tex]
What is the interquartile range of the waist measurments
The correct answer to the given question is a)29, (b) 91cm is median waist measurement and (c)13cm is interquartile range
(a)From the graph, 11 men have a waist measurement of 85cm and below. Since the cumulative frequency is 40
Number of men who have a waist measurement of more than 85 cm
= 40 − 11
= 29
(b)Median
Given a dataset of size N = 40, the median can be calculated as:
Median = (N + 1) / 2
where N is the total number of items in the dataset.
Substituting the given value of N, we get:
Median = (40 + 1) / 2
Median = 20.5
Since the median has to be a whole number, we take the 20th item as the median. Tracing 20 from the y-axis to the x-axis, the median waist measurement is 91cm.
(c)Interquartile Range = Q3 - Q1
To find the first quartile, denoted as Q1, you need to determine the value that separates the lowest 25% of the dataset from the rest of the dataset.
The formula for the first quartile is: Q1 = (N + 1) / 4
where N is the total number of items in the dataset.
Substituting the given value of N, we get:
Q1 = (40 + 1) / 4
Q1 = 10.25
Since we need to find the 10th item, which corresponds to the 25th percentile of the dataset, we take the integer part of Q1, which is 10. Therefore, the first quartile, Q1, is the 10th item.
From the graph, at y= 10, x= 84 cm
To find the third quartile, denoted as Q3, you need to determine the value that separates the highest 25% of the dataset from the rest of the dataset.
The formula for the third quartile is: Q3 = 3(N + 1) / 4
where N is the total number of items in the dataset.
Substituting the given value of N, we get:
Q3 = 3(40 + 1) / 4
Q3 = 30.75
Since we need to find the 30th item, which corresponds to the 75th percentile of the dataset, we take the integer part of Q3, which is 30. Therefore, the third quartile, Q3, is the 30th item.
From the graph, at y= 30, x =97 cm
Therefore: Interquartile Range = 97 - 84 = 13cm
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Complete Question
a) how many men have a waist measurement of more than 85 cm
b) what is the median waist measurement
c) what is the interquartile range of the waist measurements
CONNECTING CONCEPTS Find the missing dimension of the figure.
The length of the other parallel side of the parallelogram (b2) is 8.3m with the area of the parallelogram 100m².
What is a parallelogram?It is a four-sided shape that has two pairs of parallel lines with all sides equal in length.
The area of the parallelogram is 100m² and the height is 10m, so the base of the parallelogram is 13m. This forms a right triangle with one side of the parallelogram. To calculate the length of the other non-parallel side (b²), we can use the squaring method.
This can be expressed as:
a² + b² = c²
Where a and b are the two shorter sides of the triangle, and c is the longest side.
Substituting in the values given, we get:
x² + 10² = 13²
x²=13²-10²
x= √169-100
x = √69
x = 8.3m
Therefore, the length of the other non-parallel side of the parallelogram (b2) is 8.3m.
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The quadratic functions f(x) and g(x) are described in the table. x f(x) g(x) −2 4 36 −1 1 25 0 0 16 1 1 9 2 4 4 3 9 1 4 16 0 5 25 1 6 36 4 In which direction and by how many units should f(x) be shifted to match g(x)? Left by 4 units Right by 4 units Left by 8 units Right by 8 units
By inspecting the table, it can be seen that f(x) must be shifted left by 4 units in order to match g(x). Thus, Left by 4 units is the answer.
What is quadratic function?A quadratic function is a function of the form f(x) = ax² + bx + c, where a, b, and c are real numbers and a ≠ 0.
The standard form of a quadratic equation is ax² + bx + c = 0, where a, b, and c are real numbers and a ≠ 0. The solutions of the equation are the points at which the graph of the function intersects the x-axis.
The functions, that are quadratic, f(x) and g(x) are described in the table. From the table, it can be seen that f(x) and g(x) are not equal to each other, as the values for each x are different. To match f(x) and g(x), one of the functions must be shifted.
By inspecting the table, it can be seen that f(x) must be shifted left by 4 units in order to match g(x).
This can be calculated by subtracting the g(x) values from the f(x) values for each x.
For example, at x = -2, the difference between f(x) and g(x) is -32.
This difference is the same for all x values, meaning that f(x) must be shifted left by 4 units to match g(x). Thus, the correct answer is Left by 4 units.
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CD =1/2AB In quadrilateral ABCD above, AD || BC and CD =1/2AB. What is the measure of angle B? A) 150° B) 135° C) 120° D) 90°
In quadrilateral ABCD abοve, AD || BC and CD =1/2AB. the measure οf angle is B 90°
What is a quadrilateral?A quadrilateral is a clοsed shape and a type οf pοlygοn that has fοur sides, fοur vertices and fοur angles. It is fοrmed by jοining fοur nοn-cοllinear pοints. The sum οf interiοr angles οf quadrilaterals is always equal tο 360 degrees.
Since AD is parallel tο BC, we have:
∠ABC + ∠BCD = 180° (interiοr angles οn the same side οf the transversal AD)We alsο knοw that CD = 1/2AB. Let's call the length οf AB "x". Then we have:
CD = 1/2AB
CD = 1/2x
Nοw, let's lοοk at triangle BCD. We knοw that the sum οf the angles in a triangle is 180°, sο we have:
∠BCD + ∠CBD + ∠BDC = 180°
We alsο knοw that ∠BCD = ∠ABC (because they are cοrrespοnding angles), sο we can substitute ∠ABC fοr ∠BCD:
∠ABC + ∠CBD + ∠BDC = 180°
Nοw, let's use the fact that CD = 1/2x tο find the length οf BD:
BD = AB - CD
BD = x - 1/2x
BD = 1/2x
Sο, BD is half the length οf AB. This means that triangle BCD is a 30-60-90 triangle, with ∠CBD = 60° and ∠BDC = 30°.
Substituting these values intο οur equatiοn abοve, we get:
∠ABC + 60° + 30° = 180°
Simplifying, we get:
∠ABC + 90° = 180°
Subtracting 90° frοm bοth sides, we get:
∠ABC = 90°
Therefοre, the measure οf angle B is 90°.
D) 90°.
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How do i check
y=x+2
y=5x-2
After solving the equation using the elimination method, the value of x is 1 and y is 3.
The given system of equations are:
y = x + 2...............(1)
y = 5x - 2...............(2)
We solving equation by the elimination method.
The elimination method is a method of solving systems of linear equations. It involves performing operations on the equations, such as addition and multiplication, to transform the equations into simpler forms.
Subtract equation 1 and equation 2
x+2 - 5x + 2 = 0
-4x + 4 = 0
Subtract 4 on both side, we get
-4x = -4
Divide by -4 on both side, we get
x = 1
Now put the value of x in equation 1.
y = 1 + 2
y = 3
The solution set is {1, 3}.
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The complete question is:
Find the value of x and y.
y = x+2
y=5x-2
12. Find the work done in moving an object 30 feet horizontally if pulled with a force of 70 pounds with an angle of elevation of 30 degrees.
The work done in moving an object 30 feet horizontally if pulled with a force of 70 pounds with an angle of elevation of 30 degrees is $1582.07\text{ ft-lbs}$.
Given that an object is moved 30 feet horizontally if pulled with a force of 70 pounds with an angle of elevation of 30 degrees.To find the work done in moving an object, we know thatWork done = Force * Distance * cos(θ)Where θ is the angle between the force applied and the displacement of the object.Here, force applied = 70 poundsDistance = 30 feetAnd θ = 30 degreesWe know that the force is applied at an angle of 30 degrees to the horizontal, thus the horizontal component of the force is given by:Horizontal component of force = Force × cos (θ)So, the horizontal component of the force applied is:Horizontal component of force = 70 cos 30°= 60.62 pounds (approx)Therefore, the work done in moving the object 30 feet horizontally is:Work done = force × distance × cos (θ)= 60.62 × 30 × cos 0.5= 60.62 × 30 × 0.87= $1582.07 \text{ ft-lbs}$Therefore, the work done in moving an object 30 feet horizontally if pulled with a force of 70 pounds with an angle of elevation of 30 degrees is $1582.07\text{ ft-lbs}$.
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PLEASE HELP!!!! ASAP
The side length x is given as follows:
[tex]x = \frac{7}{\sqrt{3}}[/tex]
The number that belongs in the green box is of 7.
What are the trigonometric ratios?The three trigonometric ratios are the sine, the cosine and the tangent, and they are defined as follows:
Sine of angle = length of opposite side to the angle divided by the length of the hypotenuse.Cosine of angle = length of adjacent side to the angle divided by the length of the hypotenuse.Tangent of angle = length of opposite side to the angle divided by the length of the adjacent side to the angle.For the side x, we have that:
It is opposite to the angle of 30º.The other side is of 7.Hence the tangent can be applied, as follows:
tan(30º) = x/7
x = 7 x tangent of 30 degrees
[tex]x = 7 \times \frac{1}{\sqrt{3}}[/tex]
[tex]x = \frac{7}{\sqrt{3}}[/tex]
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The measure of the length of x is equal to 7/√2 using the trigonometric ratio of tangent for angle 60°.
What are trigonometric ratiosThe trigonometric ratios involves the relationship of an angle of a right-angled triangle to ratios of two side lengths. Basic trigonometric ratios includes; sine cosine and tangent.
recall that tan 60° = √2
tan 60° = 7/x {opposite/adjacent}
√2 = 7/x
by cross multiplication
x = 7/√2.
Therefore, the measure of the length of x is equal to 7/√2 using the trigonometric ratio of tangent for angle 60°.
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Domain and range of
[tex]x = {2}^{y} [/tex]
Hence, in response to the provided question, we can say that As a result, the set of all positive real numbers is the range of this equation.
What is equation?An algebraic equation is a method of connecting two quotes by using the equals symbol (=) to express equality. In algebra, an explanation is a definitive expression that verifies the equivalency of two formula. For example, the identical character divides the numbers 3x + 5 and 14. A linear equation might be used to recognize the connection that existing between the texts written on separate sides of a letter. The product and application both frequently the same. 2x - 4 equals 2, for example.
x = 2y is the provided equation.
y denotes the exponent of 2 in this equation. The exponent's base, 2, is a positive real number. As a result, y can be any real number. This equation's domain is all real numbers.
Because 2y is always positive, regardless of the value of y, the range of this equation is all positive real integers. Also, 2y can approach 0 as y approaches negative infinity, but it never does because 2y is always positive. As a result, the set of all positive real numbers is the range of this equation.
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There are 16 girls and 20 boys who want to participate in a Trivia Challenge. Each team must have the same ratio of girls and boys.
A. What is the greatest number of teams that can enter? (2 points)
B. Find how many boys and girls would be on each team. (2 points)
Each squad has to have an equal amount of men and women. The maximum number of teams that can participate is 8.
A location in mathematics where a function has its maximum value. The value is an absolute maximum if it exceeds or is equal to all other function values. It is a relative or local maximum if it is simply greater than any neighboring point.
Number of girls = 16.
Number of boys = 20.
In order to calculate the maximum number of teams that can enter, we must determine the most prevalent criteria for both boys and girls based on the information provided. As follows:
Factors of 18 [tex]= 1, 2, 4, 8[/tex] and 16.
Factors of 24 = [tex]1, 2, 3, 4, 6, 8, 12[/tex] and 24.
Highest common factor = 8
Therefore, the greatest number will be 8.
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ASAP. Will give you the brainliest answer!!! Please show working out.
Answer:
1250 pigs------------------------------
Find the area using formula:
[tex]A=(b_1+b_2)h/2[/tex]Substitute values into formula to get:
[tex]A=(12*5^3+8*5^3)(2*5^3)/2=(20*5^3)(2*5^3)/2= (10*5^3)(2*5^3)[/tex]Since each pig gets 2*5³ m² of land, by dividing the area by this number, Daniel can put:
10*5³ = 10*125 = 1250 pigs in the fieldHELP ME PLSSS!! <33 thank youuuuu
The value of t in the figure is calculated using the concept of similar triangles to be equal to
27How to find the value of tThe value of t is solved using the concept of similar triangles. this involves taking the proportions of the sides which are equal to each order
The calculation is completed as follows
JK / JG = KI / GH
substituting the values of each side
1 / 2 = t / t + 27
cross multiplying
t + 27 = 2t
collecting like terms
27 = 2t - t
27 = t
We can therefore say that the value of t is equal to 24
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1a) Let z be a standard normal random variable with mean ???? = 0 and standard deviation ???? = 1. Use Table 3 in Appendix I to find the probability. (Round your answer to four decimal places.) You may need to use the appropriate appendix table to answer this question.
P(z < 1.645) =
1b) Let z be a standard normal random variable with mean ???? = 0 and standard deviation ???? = 1. Use Table 3 in Appendix I to find the probability. (Round your answer to four decimal places.) You may need to use the appropriate appendix table to answer this question.
The probability P(z < 1.645) is the area under the standard normal curve to the left of 1.645.
What is Probability?Probability is a measure of the likelihood of an event occurring. It is expressed as a number between 0 and 1, where 0 indicates that the event is impossible and 1 indicates that the event is certain. Probability is used to assess the outcome of any random event, such as the roll of a die or the flip of a coin. It can also be used to measure the likelihood of future events, such as the stock market rising or falling.
This probability is calculated by using Table 3 in Appendix I. The probability is 0.9500, which means that 95% of the area under the normal curve is to the right of 1.645.
This phenomenon is occurring because the normal distribution is symmetrical. The area to the left and to the right of the mean are equal, and thus the probability of P(z < 1.645) is the same as the probability of P(z > 1.645). The normal distribution is also unimodal, meaning that there is a single peak and all other data points have lower probability than the peak. Since the peak of the normal distribution is at the mean (0 in this case), any value to the right of the mean will have a higher probability than any value to the left of the mean. Thus, the probability of P(z > 1.645) is greater than the probability of P(z < 1.645).
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The probability P(z < 1.645) is the area under the standard normal curve to the left of 1.645.
What is Probability?
Probability is a measure of the likelihood of an event occurring. It is expressed as a number between 0 and 1, where 0 indicates that the event is impossible and 1 indicates that the event is certain.
This probability is calculated by using Table 3 in Appendix I. The probability is 0.9500, which means that 95% of the area under the normal curve is to the right of 1.645.
The symmetric nature of the normal distribution is what is causing this phenomena. Because the area to the left and right of the mean are equal, the likelihood that z will be less than or more than 1.645 is equally likely. Furthermore, the normal distribution is unimodal, which means that there is only one peak and that all other data points have a probability that is smaller than the peak. Since the mean (0 in this case) is where the normal distribution's peak occurs, any value to the right of the mean will be more likely to occur than any value to the left of the mean. As P(z > 1.645) is more likely than P(z 1.645), the former is true.
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An object is thrown vertically upward from the surface of a celestial body at a velocity of 36 meters per second. Its distance from the surface at t seconds is given by s(t) = -0.8t^2 + 32ta) What is the object's velocity after 2 seconds?b) How many seconds does it take the object to reach its maximum height?c) What is the object's maximum height?
The answer to your question is:
a) To find the object's velocity after 2 seconds, we need to take the derivative of the function s(t) = -0.8t^2 + 32t. The derivative of s(t) is s'(t) = -1.6t + 32. To find the velocity after 2 seconds, we plug in t = 2 into the derivative equation: s'(2) = -1.6(2) + 32 = 28.8 meters per second. Therefore, the object's velocity after 2 seconds is 28.8 meters per second.
b) To find the time it takes the object to reach its maximum height, we need to find the value of t that makes the derivative of s(t) equal to zero. This is because the derivative of s(t) represents the velocity of the object, and the velocity is zero at the maximum height. So we set s'(t) = 0 and solve for t:
0 = -1.6t + 32
1.6t = 32
t = 20 seconds
Therefore, it takes the object 20 seconds to reach its maximum height.
c) To find the object's maximum height, we plug in the value of t that we found in part b into the original equation for s(t):
s(20) = -0.8(20)^2 + 32(20) = 320 meters
Therefore, the object's maximum height is 320 meters.
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Kendall washes 10 1/2 windows in 3/4 hours. At this rate, how many windows can she wash in one hour?
Answer:
To find out how many windows Kendall can wash in one hour, we can divide the number of windows washed by the time taken:
Number of windows washed per hour = (Number of windows washed) / (Time taken)
We can first convert the mixed number 10 1/2 to an improper fraction:
10 1/2 = (10 x 2 + 1) / 2 = 21/2
Substituting the given values:
Number of windows washed per hour = (21/2) / (3/4) hours
To divide by a fraction, we can multiply by its reciprocal:
Number of windows washed per hour = (21/2) x (4/3) = 28 windows/hour
Therefore, Kendall can wash 28 windows in one hour at this rate.
Answer:
14 windows
Step-by-step explanation:
All you have to do is a simple equation 10 1/2÷3 which equals 14
Please ASAP Help
Will mark brainlest due at 12:00
Answer:
1
Step-by-step explanation:
we just find the middle of the 2 places