The statement ((1)/(x))^(n)>(1)/(x) is FALSE as (1)/(x^n) will always be smaller than (1)/(x).
To evaluate this expression, let's look at the properties of exponents. When we have a fraction raised to a power, it is equivalent to raising both the numerator and denominator to that power.
So, ((1)/(x))^(n) is equivalent to (1^n)/(x^n), which simplifies to (1)/(x^n).
Now, let's compare (1)/(x^n) to (1)/(x). Since x is positive and n is a natural number excluding zero, x^n will always be greater than x.
For example, if x=2 and n=3, then x^n=8 and (1)/(x^n)=(1)/(8) while (1)/(x)=(1)/(2).
So, (1)/(x^n) will always be smaller than (1)/(x).
Therefore, the statement ((1)/(x))^(n)>(1)/(x) is FALSE.
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What is 1/5 x 11 because I don’t know
Answer: 2 1/5
Step-by-step explanation:
11= 11/1 x 1/5= 11/2= 2 1/5
Consider the regression equation » = 11.05 + 0.78x, that is estimated using a sample of 202 observations and where the standard error of the slope coefficient is 0.43. Which of
the following statements is true regarding the statistical significance of the slope
coefficient?
A. None of the above
B. It is significant at the 10% level
C. It is significant at the 5% level
D. It is significant at the 1% level
E. All of the above
The correct answer is C. It is significant at the 5% level.
To determine the statistical significance of the slope coefficient, we need to calculate the t-statistic for the slope coefficient and compare it to the critical value for the desired level of significance.
The t-statistic is calculated as:
t = (slope coefficient - hypothesized value) / standard error of the slope coefficient
In this case, the hypothesized value is 0 (no relationship between x and y) and the standard error of the slope coefficient is 0.43. So the t-statistic is:
t = (0.78 - 0) / 0.43 = 1.81
Now we need to compare this t-statistic to the critical value for the desired level of significance. For a two-tailed test with 202 - 2 = 200 degrees of freedom, the critical values are:
- 1.645 for the 10% level
- 1.96 for the 5% level
- 2.576 for the 1% level
Since the t-statistic (1.81) is greater than the critical value for the 10% level (1.645) but less than the critical value for the 5% level (1.96), we can conclude that the slope coefficient is significant at the 10% level but not at the 5% level. Therefore, the correct answer is B. It is significant at the 10% level.
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The bar graph shows the results of spinning a spinner 100 times. Use the bar graph to find the experimental probability of spinning a number less than 3.
The experimental probability of spinning a number less than 3 is given as follows:
0.38.
How to calculate a probability?A probability is calculated as the division of the desired number of outcomes by the total number of outcomes in the context of a problem/experiment.
The outcomes for this problem are given as follows:
Total outcomes: 100 outcomes.Desired outcomes: 20 + 18 = 38 outcomes in which a number less than 3 was spun.Hence the experimental probability of spinning a number less than 3 is given as follows:
p = 38/100
p = 0.38.
Missing InformationThe bars are given as follows:
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Using a formula estimate the body surface area of a person whose height is 166cm and weighs 100kg. A. 2.29m^(2) B. 2.15m^(2) C. 55.9m^(2) D. 5.44m^(2)
The correct answer is B. 2.15m^(2). The estimated body surface area of the person is 2.15m^(2).
To estimate the body surface area of a person, we can use the Mosteller formula:
BSA = square root of [(height in cm x weight in kg)/3600]
Plugging in the given values for height and weight:
BSA = square root of [(166cm x 100kg)/3600]
BSA = square root of 1660000/3600
BSA = square root of 461.11
BSA = 2.15m^(2)
Therefore, the estimated body surface area of the person is 2.15m^(2). Hence, B is the correct answer.
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Can the sides of a triangle have lengths 1, 11, and 11?
Answer:
yes
Step-by-step explanation:
there is a theorem that states that two sides of a triangle should be greater than its third which is true in this case
1+11=12 (12>11)
11+1=12 (12>11)
11+11=22 (22>1)
HELP I NEED THIS ASAP 20 POINTS
PLEASE ANSWER THESE 2 MATH QUESTIONS!!!
They are not the best factors to use because 12 cannot be simplified further into a perfect square. It is better to factor 48 into perfect squares and simplify each square root separately.
What is factors?Factors can be classified as prime or composite. A prime factor is a factor that is a prime number, meaning it is only divisible by 1 and itself. For example, the prime factors of 12 are 2 and 3. A composite factor is a factor that is not a prime number, meaning it has more than two factors. For example, 4, 6, and 12 are composite factors of 12.
Let's examine the factors 4 and 12 to see if they can be used to simplify the square root of 48:
4 is a perfect square, and its square root is 2. However, 12 is not a perfect square, and its square root cannot be simplified further.
We can write 48 as 4 x 12, so the square root of 48 can be simplified as the product of the square root of 4 and the square root of 12, or 2√12.
However, this is not the simplest form of the square root of 48. We can further simplify √12 by factoring it into perfect squares: √12 = √(4 x 3) = √4 x √3 = 2√3.
Therefore, the simplest form of the square root of 48 is 2√3, not 2√12.
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olve by Trinomial Factor (a)>(1) ob 22, 8:45:09 AM olve the quadratic by factoring. 3x^(2)+1=-25x-7 Answer: x
The solutions to the quadratic equation are x = -1/3 and x = -8.
To solve the quadratic equation 3x^2 + 1 = -25x - 7 by factoring, we first need to rearrange the equation so that all the terms are on one side of the equal sign:
3x^2 + 25x + 8 = 0
Next, we need to find two numbers that multiply to give us 8 (the constant term) and add to give us 25 (the coefficient of the x term). These numbers are 20 and 1, so we can factor the trinomial as follows:
(3x + 1)(x + 8) = 0
Now we can use the zero product property to set each factor equal to zero and solve for x:
3x + 1 = 0 or x + 8 = 0
x = -1/3 or x = -8
So the solutions to the quadratic equation are x = -1/3 and x = -8.
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Choose the sample size and significance level that will lead to a test having the highest power. N=20 n=60 n=120 a=0. 01 a=0. 05 a=0. 10
The sample size of N=120 and significance level of α=0.01 would be the most likely to lead to the highest power.
To maximize statistical power, we want to select the sample size and importance degree in order to maximize the likelihood of detecting a real effect if one exists. Better pattern size and a decreased importance degree each tend to increase statistical energy.
Assuming a -tailed test and equal variances, we will use a power analysis to determine the sample size needed to acquire a favored degree of power. Based totally on the impact size we count on to examine, we will estimate the minimum sample size required for the take look to have 80% energy (that is regularly considered acceptable).
For instance, if we count on a small impact length (d=0. 2) and an importance level of α=0. 05, we might need a pattern size of about n=128 to reap 80% power. Growing the sample length in addition would retain increased strength, however, the marginal returns could diminish.
As for significance level, lower alpha degrees tend to cause higher strength due to the fact they lessen the possibility of a type I error (false wonderful), which frees up extra of the kind I error rate for detecting genuine outcomes. However, excessively low alpha tiers can boom the chance of kind ii errors (fake negatives), which decreases strength.
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13
Write
as a decimal. If necessary, use a bar to indicate which digit or group of digits repeats.
9
The equivalent decimal value for the fraction 13/9 is [tex]1.4\bar{4}[/tex]
Fractions are a way to represent a part of a whole, and they consist of two parts: the numerator and the denominator.
To convert a fraction into a decimal, we need to divide the numerator by the denominator. In the case of 13/9, we can do the following:
13 ÷ 9 = 1.444444...
The result is a decimal that goes on forever without repeating. However, we can use a bar to indicate which digit or group of digits repeats. In this case, the digit "4" repeats, so we can write:
13/9 = [tex]1.4\bar{4}[/tex]
The bar over the digits 4 indicates that they repeat infinitely.
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Complete Question:
For the given fraction 13 /9, Write as a decimal. If necessary, use a bar to indicate which digit or group of digits repeats.
To calculate $51^2$, Alex mentally figures the value $50^2$ and adds 101. Alex subtracts a number from $50^2$ to calculate $48^2$. What number does she subtract?
Alex want to subtract 196 from . So here we have to know about basic mathematical calculation.
What is calculation?
Calculation is a mathematical process we take one or more input to get one or more output. For this we uses various operations like Addition , Subtraction, Multiplication, Division, Percentage etc.
In addition we add one or more no to other and get output.
Example : 5 + 4 + 6 = 15
In addition we subtract smaller by the bigger no.
Example : 5 -4 = 1
In Multiplication we multiply two or more number to get output.
Example : 5 x 4 x 6 = 120
In division we divide smaller number by the big one to take output.
Example : 12 / 6 = 2
So , In question, [tex]50^{2} - 48^{2} =196[/tex]
So, My answer is 196.
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Solve using the quadratic f -9d^(2)+6=-6d Write your answers as intec form, or decimals rounded
The answer to the quadratic equation -9d^(2)+6=-6d is 11/20 and -11/20. To solve the given quadratic equation f -9d^(2)+6=-6d, we need to rearrange the terms and use the quadratic formula.
Step 1: Rearrange the terms to get the equation in the standard form of ax^(2) + bx + c = 0
-9d^(2) + 6d + 6 = 0
Step 2: Identify the values of a, b, and c.
a = -9
b = 6
c = 6
Step 3: Use the quadratic formula to find the solutions for d.
The quadratic formula is given by:
d = (-b ± √(b^(2) - 4ac))/(2a)
Substitute the values of a, b, and c into the formula:
d = (-(6) ± √((6)^(2) - 4(-9)(6)))/(2(-9))
Step 4: Simplify the expression inside the square root:
d = (-(6) ± √(36 + 216))/(-18)
d = (-(6) ± √(252))/(-18)
Step 5: Simplify the expression further:
d = (-(6) ± 15.87)/(-18)
Step 6: Solve for d using both the positive and negative values inside the square root:
d = (-(6) + 15.87)/(-18) = 0.55
d = (-(6) - 15.87)/(-18) = -0.55
So, the solutions for d are 0.55 and -0.55 or 11/20 and -11/20 using the quadratic formula to solve the given quadratic equation.
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Precipitation for the month of march was 6 1/2 inches less than average. In April the precipitation was 2 3/8 inches less than average. How many inches below average was the precipitation for both march and April?
For both march and April the precipitation is [tex](4\frac{7}{16})[/tex] inches below the average.
Define Average?The term "average" refers to a central value that represents a set of numbers. There are different types of averages, such as the mean, mode and median.
Let's denote the average precipitation as "a".
In March, the precipitation was [tex]6\frac{1}{2}[/tex] inches less than the average. This can be expressed as:
March precipitation = [tex]a-6\frac{1}{2}[/tex]
In April, the precipitation was [tex]2\frac{3}{8}[/tex] inches less than the average. This can be expressed as:
April precipitation = [tex]a-2\frac{3}{8}[/tex]
To find the total precipitation below average for both March and April, we can add the two expressions:
March precipitation + April precipitation = [tex](a-6\frac{1}{2})[/tex] + [tex](a-2\frac{3}{8})[/tex]
Simplifying the expression, we get:
March precipitation + April precipitation = [tex](2a-8\frac{7}{8})[/tex]
So, after dividing by 2 in result the value will be, [tex](a-4\frac{7}{16})[/tex]
Therefore, the total precipitation below average for both March and April was [tex](4\frac{7}{16})[/tex] inches.
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Look at the coordinate plane. Determine if each point is placed correctly on the coordinate plane by selecting Yes or No. Coordinate plane with 6 points graphed. The locations of each point from the origin are as follows. Point A is 2 units left and 4 units up. Point B is 2 and one-half units right, 2 units up. Point C is 2 and one-half units right, 2 units down. Point D is 1 unit right, 3 units down. Point E is 1 unit left, 1 unit down. Point F is 2 units left, 2 and one-half units down. A (4, –2) Yes No B (212 , 2) Yes No C (212 , –2) Yes No D (1, 3) Yes No E (–1, 1) Yes No F (–2, -212 ) Yes No
The answer is A: Yes B: Yes C: Yes D: Yes E: Yes F: Yes. Each point is correctly placed on the coordinate plane.
What is coordinate plane?A coordinate plane is a two-dimensional plane consisting of two axes (x and y) which intersect at a point called the origin. The x-axis, which runs horizontally, is referred to as the abscissa and the y-axis, which runs vertically, is referred to as the ordinate. The origin, which is the point of intersection of the two axes, is the point (0, 0).The coordinate plane is also known as the Cartesian plane, named after mathematician René Descartes.
Yes, Point A is located correctly on the coordinate plane at (4, –2). Yes, Point B is located correctly on the coordinate plane at (2 1/2, 2). Yes, Point C is located correctly on the coordinate plane at (2 1/2, –2). Yes, Point D is located correctly on the coordinate plane at (1, 3). Yes, Point E is located correctly on the coordinate plane at (–1, 1). Yes, Point F is located correctly on the coordinate plane at (–2, –2 1/2).
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4.) The table shows some ingredients in lasagna. If you make three times the recipe, how many cups of cheese are needed?
Answer: 8
Step-by-step explanation:
2*3= 6
[tex]\frac{2}{3}[/tex]*3= 2
Rosie is 6 years older than Mia. In 4 years, Rosie will be three times Mia's present age. How old is Mia now?
Answer:
Let's assume that Mia's present age is x.
According to the problem, Rosie is 6 years older than Mia, so Rosie's present age is x + 6.
In 4 years, Mia's age will be x + 4, and Rosie's age will be (x + 6) + 4 = x + 10.
The problem also states that Rosie's age in 4 years will be three times Mia's present age, so we can write the equation:
x + 10 = 3x
Simplifying this equation, we can subtract x from both sides to get:
10 = 2x
Dividing both sides by 2, we get:
x = 5
Therefore, Mia is currently 5 years old. To check, we can verify that in 4 years, Rosie will be three times Mia's age:
Rosie's age in 4 years = (5 + 6) + 4 = 15
Mia's age in 4 years = 5 + 4 = 9
Rosie's age in 4 years is indeed three times Mia's age, so our solution is correct.
The equation is only a good model of the relationship when the outdoor tempeture is 55
a) When the number of chirps per minute, c = 110, then the outdoor temperature is 67.5°F.
b) If outdoor temperature is, f at least 55° F, then 60 chirps we can expect to hear in a minute at that temperature.
c) The graph for linear function, f = (1/4)c + 40, is present above.
d) The cofficient of linear function/ equation represents the slope of linear equation.
A function is a relationship that exists between two variables, where one variable depends on the other.
Independent variables, are input values and represent the horizontal axis of the cartesian plane.Dependent variable: Its result is the evaluation of the function with the values of the input values. The linear relationship is of the form: f(x) = mx + b, where m is the slope of the line, b is the intersection with the y-axis, orThe linear equation is f = (1/4)c + 40 ----(1)
where, c--> the number of chirps per minute, that the tree cricket makes is linearly dependent on f.
f--> the temperature in Fahrenheit.
a) When number of chirps per minute,c = 110. We have to determine the outdoor temperature in degrees Fahrenheit. Substitute the value c = 110 in equation (1),
=> f = 1/4×110 + 40
=> f = 27.5 + 40
=> f = 67.5
So, required value is 67.5° F.
b) The outdoor temperature is, f at least 55° F, i.e., f = 55° F
Substitute f value in equation (1),
=> 55 = (1/4)c + 40
=> 55 - 40 = (1/4)c
=> (1/4)c = 15
=> c = 4× 15
=> c = 60
c) On the coordinate plane, graph that represents the relationship between the number of chirps, c and the temperature, f is attached in above figure.
d) The cofficient 1/4 in linear equation represents the slope of equation, df/dc that is change in outdoor temperature (°F) per crickets chirp in minutes. Hence, the required cofficient represents slope.
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Complete question:
In places where there are crickets, the outdoor temperature can be predicted by the rate at which crickets chirp. One equation that models the relationship between chirps and outdoor temperature is f = (1/4)c + 40, where c is the number of chirps per minute and f is the temperature in degrees Fahrenheit.
a). Suppose 110 chirps are heard in a minute. According to this model, what is the outdoor temperature?
b) The equation is only a good model of the relationship when the outdoor temperature is at least 55∘F. (Below that temperature, crickets aren't around or inclined to chirp.) How many chirps can we expect to hear in a minute at that temperature?
c) On the coordinate plane, draw a graph that represents the relationship between the number of chirps and the temperature.
d) Explain the cofficient 1/4 in equation tells us about relationship.
Gina Wilson unit7 homework 3
When two straight lines or rays intersect at a single endpoint then an angle is created. The vertex of an angle is that location where two points are come together.
What is the Supplementary angle?The sum of angles equal to 180° is called Supplementary Angle.
Complementary Angle, Sum of the angle is equal to 90°.
a. (10x + 7) + (4x + 5) = 180 ( Supplementary angle )
14x + 12 = 180
14x = 180 -12
x = 12
10x + 7 = 127°
4x + 5 = 53°
c. (5x -11) + (8x -3) = 90 ( Complementary Angle )
13x - 14 = 90
13x = 90 + 14
x = 8
5x - 11 = 29°
8x - 3 = 61°
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9. The sum of the squares of n standard gaussians is known as a Chi square and denoted by xh. In other words, if Z1, Z2, ..., , Zn are independent N(0, 1) then, x2 z +Z2 ...+22 where d over = means the two sides have the same distribution, i.e. they show the same values with the same probabilities. Use the CLT to find P(xż5 > 30). The closest value is, (A) 0.18 (B) 0.24 (C) 0.20 (D) 0.22 (E) 0.16
The sum of the squares of n standard gaussians is known as a Chi square and denoted by x2. In other words, if Z1, Z2, ..., Zn are independent N(0, 1) then x2 = Z1^2 + Z2^2 + ... + Zn^2. to use the Central Limit Theorem (CLT) to find P(x2 > 30). The closest value is (C) 0.20 The correct option is C) 0.20
The CLT states that the sum of a large number of independent and identically distributed random variables will be approximately normally distributed. In this case, the sum of the squares of n standard gaussians (x2) will be approximately normally distributed with mean n and variance 2n.
Therefore, we can standardize x2 to find the probability that it is greater than 30:
Z = (x2 - n) / sqrt(2n)
We want to find P(x2 > 30), which is equivalent to P(Z > (30 - n) / sqrt(2n)). Using the standard normal table, we can find the closest value to this probability. The closest value is (C) 0.20. Therefore, the answer is (C) 0.20.
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Write an algebraic expression for each word expression then evaluate the expression for these values of the variable 1, 6, 13.5. five the quotient of 100 and the sum of B and 24
Answer:
the quotient of 100 and the sum of B and 24
Step-by-step explanation:
The word expression is: "the quotient of 100 and the sum of B and 24"
The algebraic expression is: 100 / (B + 24)
To evaluate this expression for the values 1, 6, and 13.5, we substitute each value in turn for B and simplify:
When B = 1:
100 / (1 + 24) = 100 / 25 = 4
When B = 6:
100 / (6 + 24) = 100 / 30 = 3.33...
When B = 13.5:
100 / (13.5 + 24) = 100 / 37.5 = 2.666...
Therefore, the values of the expression for B = 1, 6, and 13.5 are approximately 4, 3.33, and 2.67, respectively.
need help with 10 quick!!!!!!!
Answer:
28 7/12
Step-by-step explanation:
When solving a polynomial equation by factoring, to which factors can we apply the zero-product property?
When solving a polynomial equation by factoring, we can apply the zero-product property to the factors that are equal to zero.
The zero-product property states that if the product of two or more factors is equal to zero, then at least one of the factors must be equal to zero. For example, if (x-2)(x+3) = 0, then either (x-2) = 0 or (x+3) = 0.
In the case of a polynomial equation, we can apply the zero-product property to the factors that are equal to zero in order to find the values of x that make the equation true.
For example, if we have the equation x^2 - 5x + 6 = 0, we can factor the left-hand side of the equation to get (x-2)(x-3) = 0. We can then apply the zero-product property to find that either (x-2) = 0 or (x-3) = 0, which means that x = 2 or x = 3 are the solutions to the equation.
In summary, when solving a polynomial equation by factoring, we can apply the zero-product property to the factors that are equal to zero in order to find the values of x that make the equation true.
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Find the area of the shaded regions. Give your answer as a completely simplified exact value in terms of π (no approximations).
The area of the shaded region is 7πcm²
What is area?The space enclosed by the boundary of a plane figure is called its area. The area of a figure is the number of unit squares that cover the surface of a closed figure. Area is measured in square units like cm² and m².
The area of a circle is expressed as πr²
area of the unshaded parts = 2× πr²
=2 (π × 1²)
= 2π cm²
area of the big circle = πr²
= π × 3²
= 9πcm²
area of the shaded part = 9π -2π
= 7π cm²
therefore the area of the shaded part is 7πcm²
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(1) Compute the following calculations: (a) 2 + 3i + 4 - 3i. (b) (3 + 2i)(1 - i). (c) 2 + 3i - (1 - i). (d) 2+3i / 1-i
(2) Suppose that f(x) is a polynomial. Suppose that x = 1 – 3i, x = 2 and x = 4 are roots of f(x). find of f(x).
1) a. 6 b. 5 - i c. 1 + 4i d. -0.5 + 2.5i
2) x^3 - (7 - 3i)x^2 + (14 - 6i)x - (8 - 24i).
(1)
(a) 2 + 3i + 4 - 3i = 6 + 0i = 6
(b) (3 + 2i)(1 - i) = 3 + 2i - 3i - 2i^2 = 3 - i + 2 = 5 - i
(c) 2 + 3i - (1 - i) = 2 + 3i - 1 + i = 1 + 4i
(d) 2+3i / 1-i = (2+3i)(1+i) / (1-i)(1+i) = (2+2i+3i+3i^2) / (1-i+i-i^2) = (2+5i-3) / (1+1) = (-1+5i) / 2 = -0.5 + 2.5i
(2)
If x = 1 – 3i, x = 2, and x = 4 are roots of f(x),
then we can write f(x) as:
f(x) = (x - (1 - 3i))(x - 2)(x - 4)
Multiplying these factors out, we get:
f(x) = (x^2 - (1 - 3i)x - 2x + 2(1 - 3i))(x - 4)
f(x) = (x^2 - (3 - 3i)x + 2 - 6i)(x - 4)
f(x) = x^3 - (7 - 3i)x^2 + (14 - 6i)x - (8 - 24i)
So, the polynomial f(x) is x^3 - (7 - 3i)x^2 + (14 - 6i)x - (8 - 24i).
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NEEEED HELP NOWWWW!!!!!!!
. A circle centered at (0, 0) has a radius of 10. Point S on the circle has an x-coordinate of 6. What is the y-coordinate of point S? Explain your reasoning
Answer:
See explanation below
Step-by-step explanation:
S has x-coordinate of 6 => the distance from origin to x-coordinate is 6 units, which is one leg of the right triangle
Pythagorean theorem states that the sum of the squares on the legs of a right triangle is equal to the square on the hypotenuse.
c^2 = a^2 + b^2
with c = 10, a = 6
10^2 = 6^2 + b^2
b^2 = 100 - 36 = 64
b = √64 = 8
Point S can have 2 y-coordinates, one (+) and one (-) depending on the location of point S, so S can be either (6,8) or (6,-8)
Let f(x)=2x+2 and g(x)=2x^2 +2x After simplifying, (f∘g)(x)=." Let f(x)=1/x-2 and g(x)=3/x +2. Find the following functions. Simplify your answers. f(g(x))= g(f(x))=
The function f(g(x)) = x/(3+2x)-2 and g(f(x)) = (-x+2)/(1-2x) after simplifying.
The composition of two functions f and g is denoted by (f∘g)(x) and is defined as f(g(x)). In other words, we apply the function g to the input x, and then apply the function f to the result.
For the first part of the question, let f(x)=2x+2 and g(x)=2x²+2x. To find (f∘g)(x), we apply g(x) to the input x and then apply f(x) to the result:
(f∘g)(x) = f(g(x)) = f(2x²+2x) = 2(2x²+2x)+2 = 4x^2+4x+2
So, (f∘g)(x) = 4x^2+4x+2 after simplifying.
For the second part of the question, let f(x)=1/x-2 and g(x)=3/x+2. To find f(g(x)), we apply g(x) to the input x and then apply f(x) to the result:
f(g(x)) = f(3/x+2) = 1/(3/x+2)-2 = 1/(3+2x)/x-2 = x/(3+2x)-2
To find g(f(x)), we apply f(x) to the input x and then apply g(x) to the result:
g(f(x)) = g(1/x-2) = 3/(1/x-2)+2 = 3x/(1-2x)+2 = (3x+2-4x)/1-2x = (-x+2)/(1-2x)
So, f(g(x)) = x/(3+2x)-2 and g(f(x)) = (-x+2)/(1-2x) after simplifying.
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Complaints about an internet brokerage firm occur at a rate of 1. 1 per day. The number of complaints appears to be poisson distributed. Find the probability that the firm receives more than 4 complaints in a 3-day period. Round all final answers to 1 decimal place and express answers in percent form (i. E. 30. 0% instead of 0. 3) (a) what is the probability of receiving 0 complaints in a 3-day period? (b) what is the probability of receiving 1 complaint in a 3-day period? (c) what is the probability of receiving 2 complaints in a 3-day period? (d) what is the probability of receiving 3 complaints in a 3-day period? (e) what is the probability of receiving 4 complaints in a 3-day period? (f) what is the probability of receiving less than or equal to 4 complaints in a 3-day period? (g) what is the probability of receiving more than 4 complaints in a 3-day period?
Using Poisson distribution, the probability of each scenario is attached below.
What is the probability of receiving 0 complaints in a 3-day period(a) The probability of receiving 0 complaints in a 3-day period is given by the Poisson distribution:
P(X=0) = (λ^x * e^(-λ)) / x!
where λ is the expected number of complaints per day, and x is the number of complaints in the time period of interest.
In this case, λ = 1.1 complaints per day, and x = 0 complaints in 3 days.
P(X=0) = (1.1^0 * e^(-1.1 * 3)) / 0! = 0.037
So the probability of receiving 0 complaints in a 3-day period is 3.7%.
(b) The probability of receiving 1 complaint in a 3-day period is:
P(X=1) = (1.1^1 * e^(-1.1 * 3)) / 1! = 0.041
So the probability of receiving 1 complaint in a 3-day period is 4.1%.
(c) The probability of receiving 2 complaints in a 3-day period is:
P(X=2) = (1.1^2 * e^(-1.1 * 3)) / 2! = 0.022
So the probability of receiving 2 complaints in a 3-day period is 2.2%.
(d) The probability of receiving 3 complaints in a 3-day period is:
P(X=3) = (1.1^3 * e^(-1.1 * 3)) / 3! = 0.008
So the probability of receiving 3 complaints in a 3-day period is 0.8%.
(e) The probability of receiving 4 complaints in a 3-day period is:
P(X=4) = (1.1^4 * e^(-1.1 * 3)) / 4! = 0.0022
So the probability of receiving 4 complaints in a 3-day period is 0.22%.
(f) The probability of receiving less than or equal to 4 complaints in a 3-day period is:
P(X ≤ 4) = P(X=0) + P(X=1) + P(X=2) + P(X=3) + P(X=4) = 0.1102
So the probability of receiving less than or equal to 4 complaints in a 3-day period is 11.02%.
(g) The probability of receiving more than 4 complaints in a 3-day period is:
P(X > 4) = 1 - P(X ≤ 4) = 1 - 0.1102 = 0.8898
So the probability of receiving more than 4 complaints in a 3-day period is 88.98%.
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if juan's taxi fare was $7.65 how many miles did he travel in the taxi
The number of miles travelled by Juan is 28 miles.
What is an equation?An equation is a mathematical statement that shows that two mathematical expressions are equal.
For example, 3x + 5 = 14 is an equation, in which 3x + 5 and 14 are two expressions separated by an 'equal' sign.
Given that, a taxi fare is given by an expression, F = 2.25+0.20(m-1), where F is the taxi fare and m is the number of miles traveled,
We need to find the number of miles if the taxi fare is $7.65
Put F = 7.65 in equation given to find the value of m,
7.65 = 2.25+0.20(m-1)
5.4 = 0.20(m-1)
m-1 = 5.4 / 0.2
m-1 = 27
m = 28
Hence, the number of miles travelled by Juan is 28 miles.
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364683-5794+8679*4/86.99
An aircraft takes off and climbs at 10° to 30,000
ft, Find the ground distance travelled:
(Use 1 Nm = 6076 ft, sin 10° = 0.174 cos10°= 0.985
tan10° = 0.176)
To find the ground distance traveled by the aircraft, we can use the trigonometric function tangent. The tangent of an angle in a right triangle is equal to the opposite side divided by the adjacent side. In this case, the opposite side is the height of the aircraft (30,000 ft) and the adjacent side is the ground distance traveled (x).
Therefore, we can set up the following equation:
tan10° = 30,000/x
We are given that tan10° = 0.176, so we can substitute that value into the equation:
0.176 = 30,000/x
Next, we can cross-multiply and solve for x:
x = 30,000/0.176
x ≈ 170,455 ft
Finally, we can convert the ground distance traveled from feet to nautical miles using the conversion factor 1 Nm = 6076 ft:
170,455 ft * (1 Nm/6076 ft) ≈ 28.06 Nm
Therefore, the ground distance traveled by the aircraft is approximately 28.06 nautical miles.
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u/4>9 what is the answer?
Answer:
u>36
Step-by-step explanation:
u>36
9×4=36
so u>36