The statement " If n is odd, then n³ +1 is even " can easily be proved by a direct proof
What is an integer?
A full number, not a fraction, that can be positive, negative, or zero is called an integer (pronounced IN-tuh-jer). Integer examples include: -5, 1, 5, 8
Let the first Integer be x
Since the two numbers are consecutive
therefore the second number will be x+1
If n is odd, then its cube n³ is always odd
then n³ +1 is always even
So, the option" If n is odd, then n³ +1 is even " is correct
The statement " If n is odd, then n³ +1 is even " can easily be proved by a direct proof
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Given
f(x) = x2 + 5
and
(fg)(x) = 3x(x2 + 5),
what is
g(x)?
g(x) =
Answer:
We are aware of the equation.
Equation 1 reads (fg)(x) = f(x) * g(x).
Hence, we can resolve it as follows:
Given equation: equation 2 (fg)(x) = 3x (x2 + 5)
Equation 3 is obtained by comparing equations 1 and 2, as follows:
"f(x)*g(x)" equals "3x (x2 + 5" - The equation 3 that is provided: f(x) = x2 + 5
When we change equation 3 to read f(x) = x2 + 5, we get:
(x2 + 5) * g(x) = 3x (x2 + 5)
See what both equations have in common; it is (x2 + 5)
The result of dividing both sides by x2 + 5 is:
g(x) = 3x
G(x) will therefore have a value of 3x.
From the above equation given in the question , we get that g(x) have a value of 3x.
We are aware of the equation.
Equation 1 reads (fg)(x) = f(x) * g(x).
Hence, we can resolve it as follows:
Given equation: equation 2 (fg)(x) = 3x (x2 + 5)
Equation 3 is obtained by comparing equations 1 and 2, as follows:
"f(x)*g(x)" equals "3x (x2 + 5" - The equation 3 that is provided: f(x) = x2 + 5
When we change equation 3 to read f(x) = x2 + 5, we get:
(x2 + 5) * g(x) = 3x (x2 + 5)
See what both equations have in common; it is (x2 + 5)
The result of dividing both sides by x2 + 5 is:
g(x) = 3x
G(x) will therefore have a value of 3x.
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Ms. Keenan is a high school teacher who wants to know how much time students spend studying each day. She finds that the average student spends 3.00 hours a day studying (s - 0.75). Assuming that studying hours is normally distributed, what percentage of students study less than 2.50 hours a day?
© 25.14 percent
© 19.15 percent
© 10.93 percent
© 24.86 percent
The requried, percentage of students who study less than 2.50 hours a day is approximately 25.14 percent.
What is the Z -a score?A Z-score is stated as the fractional model of data point to the mean using standard deviations.
We need to convert 2.50 hours to a standard score (z-score) using the formula,
z = (x - μ) / σ
where x is the value we want to convert, μ is the mean, and σ is the standard deviation.
z = (2.50 - 3.00) / 0.75
z = -0.67
This means that 2.50 hours is 0.67 standard deviations below the mean.
We can use a standard normal distribution table or a calculator to find the percentage of the distribution that falls below this standard score. For example, using a standard normal distribution table, we can look up the area to the left of z = -0.67 and get:
P(z < -0.67) = 0.2514
So the correct answer is (a) 25.14 percent.
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In each diagram line k is parallel to line l and line t intersects lines k and l.
Based on the diagram complete a true statement about x, by using the answer bank.
Answer:
x = 7.5
m∠EGB = 75°
m∠EGA = 105°
Step-by-step explanation:
According to the Alternate Exterior Angles Theorem, angles EGB and CHF are equivalent. This means we can find x by setting them equal to each other.
10x = 2x + 60 (subtract 2x from both sides)
8x = 60 (divide both sides by 8)
x = 7.5
We can now plug in x to find m∠EGB.
2(7.5) + 60 = 15 + 60 = 75
Therefore, m∠EGB = 75°
As EGB and EGA are supplementary angles, that means that together, they add up to 180°. That means:
75 + EGA = 180 (subtract 75 from both sides)
m∠EGA = 105°
Write the sentence as an equation.
180 and t more is 267
Answer:
180 + t = 267
Step-by-step explanation:
180 and t more is the same as adding t to 180.
"is" means equals
Which scatterplot shows the weakest positive linear association?
The scatterplot shows the weakest positive linear association is (a)
How to determine the scatterplotFrom the question, we have the following parameters that can be used in our computation:
The graphs
A good line of best fit would have equal number of points on either sides
Using the images as a guide, we can see that:
Graph (a) and (b) have a positive linear association while graph (a) have the least number of points that appear to be on a straight line
This means that the line with the weakest is (a)
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Si una pelota más un bate cuesta 1.10 dólares el precio del bate es 1 dólar más que la pelota
Answer:
Step-by-step explanation:
If a ball plus a bat costs 1.10 dollars and the price of the bat is 1 dollar more than the ball, what is the cost of the bat?
If we represent the price of the ball as "p", then the price of the bat will be "p + 1", since the problem tells us that the price of the bat is 1 dollar more than the price of the ball.
We also know that the sum of the price of the ball and the bat is 1.10 dollars. We can write this as an equation:
p + (p + 1) = 1.10
Simplifying and solving for p, we get:
2p + 1 = 1.10
2p = 0.10
p = 0.05
Therefore, the price of the ball is 0.05 dollars. To calculate the price of the bat, we can add 1 dollar to the price of the ball:
p + 1 = 0.05 + 1 = 1.05
So, the price of the bat is 1.05 dollars.
Solve the problem.
The finance charge per $100 financed for a stove that is paid off in 24 equal monthly payments is $11.45. Use an APR table to find the APR for this loan.
11%
14%
10.5%
14.13%
the APR for this loan is approximately 14.27%.
To find the APR for this loan, we can use the formula:
APR = (2 * n * F) / (P * (n + 1))
where:
n = number of payments (24 in this case)
F = finance charge per $100 financed ($11.45 in this case)
P = amount financed per $100 (which we don't know yet)
We need to solve for P to be able to use the formula. We know that the finance charge is $11.45 for every $100 financed, so we can set up the equation:
11.45 = F / P
where F is the finance charge per $100 financed and P is the amount financed per $100.
Solving for P, we get:
P = F / 11.45
P = 100 * (11.45 / 100)
P = $1,000
So the amount financed is $1,000.
Now we can substitute the values into the APR formula:
APR = (2 * n * F) / (P * (n + 1))
APR = (2 * 24 * 11.45) / (1000 * (24 + 1))
APR = 0.1427 or 14.27%
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which data set could be represented by the box plot shown below?
The data set (B) could be represented by the shown box plot.
What is the box and whisker plot?A box and whisker plot (also known as a box plot) expresses a five-number summary of a set of data: lowest, lower quartile, median, upper quartile, and maximum.
The box plot is given in the question as shown, as per the data :
Minimum = 41
First quartile Q1 = 43
Median = 44
Third quartile Q3 = 48
Maximum = 50
According to set (B), we have:
41, 42, 43, 43, 43, 45, 47, 48, 50, 50
Here, Minimum = 41
First quartile Q1 = 43
Median = (43+45/2) = 44
Third quartile Q3 = 48
Maximum = 50
Therefore, the data set (B) could be represented by the shown box plot.
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Solve the following quadratic function by utilizing the square root method. simplify your answer completely (x)=81x^2 -16
The quadratic function has its solution to be x = 4/9 and x = -4/9
How to solve the quadratic functionFrom the question, we have the following parameters that can be used in our computation:
f(x) = 81x^2 - 16
Express the expression as difference of two squares
So, we have the following representation
f(x) = (9x)^2 - 4^2
Apply the difference of two squares rule
So we have
f(x) = (9x - 4)(9x + 4)
This gives
(9x - 4)(9x + 4) = 0
So, we have
9x = 4 and 9x = -4
Evaluate
x = 4/9 and x = -4/9
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find x and y if the line through(0,0) and (x, y) has slope 1/2 and the line through (x, y) and (7,5) has slope 2
The values of the coordinates x and y is P ( 6 , 3 )
What is an Equation of a line?The equation of a line is expressed as y = mx + b where m is the slope and b is the y-intercept
And y - y₁ = m ( x - x₁ )
y = y-coordinate of second point
y₁ = y-coordinate of point one
m = slope
x = x-coordinate of second point
x₁ = x-coordinate of point one
The slope m = ( y₂ - y₁ ) / ( x₂ - x₁ )
Given data ,
Let the equation of line be represented as A
Now , the value of A is
Let the first point be P ( x , y )
Let the second point be Q ( 0 , 0 )
Now , the slope of the line is m₁ = ( y₂ - y₁ ) / ( x₂ - x₁ )
Substituting the values in the equation , we get
Slope m₁ = y / x
m₁ = 1/2
So , y/x = 1/2
And , x = 2y
Now , the third point is R ( 7 , 5 )
m₂ = ( 5 - y ) / ( 7 - x )
m₂ = 2
On simplifying , we get
( 5 - y ) / ( 7 - x ) = 2
Multiply by ( 7 - x ) , we get
5 - y = 14 - 2x
Adding 2x and subtracting 5 on both sides , we get
2x - y = 9
Substitute the value of x from m₁ , we get
2 ( 2y ) - y = 0
3y = 9
Divide by 3 on both sides , we get
y = 3
And , the value of x = 6
Hence , the coordinate of the point P is P ( 6 , 3 )
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When building a house, the number of days required to build is inversely proportional to with the number of workers. One house was built in 10 days by 44 workers. How many days would it take to build a similar house with 5 workers?
Answer:
88 days
Step-by-step explanation:
inversely proportional means for a response y and input x, we have the formula
y = k/x
10 days = k/44 workers
multiply both sides by 44 to find k
44 workers * 10 days = k
k = 440 workers * days
y = k/x
x = 5 workers
440 workers * days / 5 workers = y
88 days = y
In a completely randomized experimental design involving six treatments, 11 observations were recorded for each of the six treatments. The following information is provided.
SSTR = 400 (Sum Square Between Treatments)
SST = 700 (Total Sum Square)
The mean square within treatments (MSE) is _____.
a. 5 b. 400 c. 80 d. 300
The mean square within treatments (MSE) is 5 when in a completely randomized experimental design involving six treatments, 11 observations were recorded for each of the six treatments.
What is mean?Mean is a measure of central tendency which represents the average value of a set of numbers. It is calculated by adding up all the values in the set and then dividing the sum by the total number of values in the set.
Here,
To find the mean square within treatments (MSE), we need to use the formula:
MSE = SSE / df
where SSE is the sum of squares within treatments and df is the degrees of freedom within treatments.
Since we are given SSTR and SST, we can find SSE using the formula:
SSE = SST - SSTR
Substituting the given values, we get:
SSE = 700 - 400 = 300
The total number of observations is:
n = 6 treatments × 11 observations/treatment = 66 observations
The degrees of freedom within treatments is:
df = n - number of treatments = 66 - 6 = 60
Therefore, the mean square within treatments is:
MSE = SSE / df
= 300 / 60
= 5
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In studying his campaign plans, Mr. Singleton wishes to estimate the difference between men's and women's views regarding his appeal as a candidate. He asks his campaign manager to take two random independent samples and find the 99% confidence interval for the difference. A random sample of 659 male voters and 629 female voters was taken. 282 men and 182 women favored Mr. Singleton as a candidate. Find this confidence interval. Step 1 of 4: Find the values of the two sample proportions, pˆ1p^1 and pˆ2p^2. Round your answers to three decimal places. confidence interval. Step 2 of 4: Find the critical value that should be used in constructing the confidence interval. Step 3 of 4: Find the value of the standard error. Round your answer to three decimal places Step 4 of 4: Construct the 99% confidence interval. Round your answers to three decimal places.
We can be 99% confident that the true difference between the proportion of men and women who favor Mr. Singleton as a candidate is between 0.059 and 0.219.
How to calculate [tex]\mathrm{\hat p_1}[/tex] and [tex]\mathrm{\hat p_2}[/tex] sample proportions?Step 1: Determine the values of the [tex]\mathrm{\hat p_1}[/tex] and [tex]\mathrm{\hat p_2}[/tex] sample proportions.
The percentage of men who, on average, support Mr. Singleton is:
[tex]\mathrm{\hat p_1}[/tex] = [tex]\dfrac{282}{659}[/tex], or around 0.428
The percentage of women who favour Mr. Singleton, as a sample, is:
[tex]\mathrm{\hat p_2}[/tex] = [tex]\dfrac{182}{629}[/tex], or around 0.289
Locate the critical value that must be utilised to build the confidence interval in step 2.
The level of significance is [tex]\alpha[/tex] = 0.01/2 = 0.005 (divided by 2 because it's a two-tailed test) because we want to determine a 99% confidence interval. The critical value for a z-score with [tex]\alpha[/tex] = 0.005 is roughly 2.576 when using a table or calculator.
Step 3: Determine the standard error's value.
The standard error of the difference between two sample proportions is calculated as follows:
[tex]\mathrm{(\Hat p 2-\Hat p 2) + n_1 + \frac {\hat p_2}{1}}[/tex]
When we enter the values from the issue, we obtain:
[tex]\mathrm{SE = \sqrt{\dfrac{\hatp_1}{SE}} = (\hat p_1 - \hat p_2) (\hat p_1 - \hat p_1) }[/tex]
Create the 99% confidence interval in step four.
We may create the confidence interval using the sample proportions, critical value, and standard error:
[tex]\mathrm{SE(\hat p_1 - \hat p_2) 1:00 \ p.m. \ to \ 2:00 \ p.m. \ z \ \alpha \ 2}[/tex]
When we change the values, we obtain:
2.576, × 0.031, = (0.428 - 0.289).
If we simplify, we get:
[tex]$$0.139 \pm \ 0.08$$[/tex].
3. Find the value of the standard error.
The following formula is used to compute the standard error of the difference between two sample proportions:
[tex]\mathrm{SE = \sqrt{\dfrac{\hatp_1}{SE}} = (\hat p_1 - \hat p_2) (\hat p_1 - \hat p_1) }[/tex]
[tex]\mathrm{(\Hat p 2-\Hat p 2) + n_1 + \frac {\hat p_2}{1}}[/tex]
When we type in the issue's values, we get:
[tex]$ \mathrm{\sqrt{(\frac{1-0.428}{0.659}) + \frac{1-0.288}{0.629}) }= about \ 0.031 \ for \ SE (\hat p_1 - \hat p_2)}[/tex]
In step four, calculate the 99% confidence interval.
With the sample proportions, critical value, and standard error, we can calculate the confidence interval:
[tex]\mathrm{SE(\hat p_1 - \hat p_2) 1:00 \ p.m. \ to \ 2:00 \ p.m. \ z \ \alpha \ 2}[/tex]
When the values are changed, we get the following result: [tex]$2.576 \times 0.031 = (0.428 - 0.289)$$[/tex]
Simplifying, we obtain: [tex]$$0.139 \pm \ 0.08$$[/tex].
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What is the cosine equation of the function shown?
Enter your answer by filling in the boxes. Enter any phase shift as its smallest multiple from the fundamental period.
f(x)= __cos(x__)__
The cosine equation of the function is y = 5cos (x + π/4) + (4).
What is the cosine function?
The right-angled triangle's angle and the ratio of its two side lengths are related by the trigonometric functions, which are actual functions. They are extensively employed in all fields of geometry-related study, including geodesy, solid mechanics, celestial mechanics, and many others.
Here, we have
y = A cos (Bx - C) + D
A (amplitude) = max - D
B = Period/2π ---> Period is the distance from max to next max
C = B · Phase Shift ---> Phase shift is the distance from the y-axis to the max
D (vertical shift) = (max + min)/2
Maximum = 9, minimum = -1
A = (maximum-minimum)/2 = (9 - -1)/2 = 10/2 = 5
Vertical shift = maximum - A = 9 - 5 = 4
The maximum occurs at x = -π/4, and
for the original function (without shift), the maximum occurs at x = 0
So, the horizontal shift = 0 - (-π/4) = π/4
Hence, the cosine equation of the function is y = 5cos (x + π/4) + (4).
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Is the expression correct or incorrect? 7−2(3−8x) = 7−2(−5x)
The requried expression is correct for any value of x. We need to check if the expression is true for all possible values of x to know if it is always correct.
What is simplification?The process in mathematics to operate and interpret the function to make the function or expression simple or more understandable is called simplifying and the process is called simplification.
Here,
We can simplify both sides of the equation to see if they are equivalent:
7 − 2(3 − 8x) = 7 − 2(−5x)
First, simplify the expression in the parentheses on the left side:
7 − 2(3 − 8x) = 7 − 6 + 16x
7 − 2(3 − 8x) = 16x + 1
7 - 6 + 16x = 16x + 1
1 + 16x = 16x + 1
So, the expression is correct for any value of x. However, we would need to check if the expression is true for all possible values of x to know if it is always correct.
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I need help not good with story problems
Answer: 62,000
2,000+4,000+8,000+16,000+32,000
100 people are given a standard antibiotic to treat an infection and another 100 are given a new antibiotic. In the first group, 90 people recover; in the second group, 85 people recover. Let p1 be the probability of recovery under the standard treatment and let p be the probability of recovery under the new treatment. We are interested in estim p1 - p2. Provide an estimate, standard error, an 80 percent confidence interval, and a 95 percent confidence interval for θ.
An 80 percent confidence interval, and a 95 percent confidence interval for θ are (0.0471,0.0529) and (0.0455 , 0.0545) respectively.
What is confidence interval?
A confidence interval is a range of estimates for an unknown quantity in frequentist statistics.The most frequent confidence level is 95%, but other levels, such 90% or 99%, are infrequently used for generating confidence intervals.
The true value of an unknown parameter is calculated using a confidence interval, a sort of interval computation used in statistics, based on the observed data. The interval provides a level of confidence in its estimation of the deterministic parameter, which is measured by the confidence level.
P1= 90/100= 0.9
P2= 85/100= 0.85
The estimate θ =P1-P2 =0.05
p = (X_1+X_2)/(n_1+n_2) = (90+85)/(100+100) = 0.88
Standard deviation =√{P*(1-P)*(1/n1+1/n2)}
= √(0.88*0.12*0.02)
=0.0023
80% confidence interval for θ:
(0.0471 , 0.0529)
95% confidence interval for θ: (0.0455 , 0.0545)
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My teacher gave me an extra credit assignment with 25 minutes left of class. It is extra credit, not a timed assessment. need done asap
The proof is incorrect and step number 3 is the first unjustified step due to missing prior step.
What is a rectangle?A quadrilateral with equal angles and parallel opposite sides is referred to as a rectangle. Around us, there are a lot of rectangle items. The length and width of any rectangle form serve as its two distinguishing attributes. The width and length of a rectangle, respectively, are its longer and shorter sides.
The step 3 in the given explanation is unjustified step. The step needs to be place at the last in order to take in consideration all the steps and properties of a rectangle.
Hence, the proof is incorrect and step number 3 is the first unjustified step due to missing prior step.
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Solve for ø sin(ø-30)=cosø
The value of ø in the given equation ø sin(ø-30)=cosø is 60 - 2πn, where n is an integer
What is Trigonometry?Trigonometry is a branch of mathematics that studies relationships between side lengths and angles of triangles.
We can solve this equation using trigonometric identities.
We know that sin(ø - 30) = cos(90 - (ø - 30)) = cos(120 - ø).
So, the equation becomes:
cos(120 - ø) = cosø
Using the identity cos(A) = cos(B) if and only if A = ±B + 2πn, where n is an integer, we get:
120 - ø = ±ø + 2πn
Simplifying and solving for ø, we get:
ø = 60 ± 2πn
So, the solutions are:
ø = 60 + 2πn, where n is an integer or
ø = 60 - 2πn, where n is an integer
Hence, the value of ø in the given equation ø sin(ø-30)=cosø is 60 - 2πn, where n is an integer
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Determine what number should be added to complete the square of the expression 4x^2-8x
The number that should be added to complete the square of the expression 4x² - 8x is 1.
What is an expression?
Mathematical expressions consist of at least two numbers or variables, at least one arithmetic operation, and a statement. It's possible to multiply, divide, add, or subtract with this mathematical operation.
To complete the square of the expression 4x² - 8x, add a constant term that will make it a perfect square trinomial.
First, factor out the coefficient of the x² term -
4x² - 8x = 4(x² - 2x)
Next, add a constant term that will make the expression inside the parentheses a perfect square.
To do this, take half of the coefficient of the x term and square it.
Half of -2 is -1, and (-1)^2 is 1.
So add 1 to the expression inside the parentheses to make it a perfect square -
4x² - 8x + 1 = 4(x² - 2x + 1)
Simplify this expression by factoring the trinomial inside the parentheses -
4x² - 8x + 1 = 4(x - 1)²
Therefore, the number is 1.
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Rewrite in scientific notation: 15,600,000
Pls answer as soon as possible
The interval over which the functions have the same average rate of change is given as follows:
x = 1 to x = 2.
How to obtain the average rate of change?The average rate of change of a function is given by the change in the output divided by the change in the input.
The function g(x) is given as follows:
g(x) = 18x + 12.
It is a linear function with a slope of 18, hence the average rate of change over each interval is of 18.
For function f(x), the rates are given as follows:
x = -7 to x = 3: (6 x 3² + 12 - 6 x (-7)² - 12)/10 = -24.x = -4 to x = 0: (6 x (0)² + 12 - 6 x (-4)² - 12)/4 = -24.x = 4 to x = 6: (6 x (6)² + 12 - 6 x (4)² - 12)/2 = 60.x = 1 to x = 2: (6 x (2)² + 12 - 6 x (1)² - 12)/1 = 18. -> same rate as g(x).More can be learned about the average rate of change of a function at brainly.com/question/11627203
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coupon-collecting problem. there are c different types of coupon, and each coupon obtained is equally likely to be any one of the c types. find the probability that the first n coupons which you collect do not form a complete set, and deduce an expression for the mean number of coupons you will need to collect before you have a complete set
This expression gives the mean number of coupons you will need to collect before you have a complete set, given that each coupon obtained is equally likely to be any one of the c types.
What is probability?In general, probability is a measure of the likelihood that a certain event or outcome will occur. It is a branch of mathematics concerned with analyzing and quantifying uncertainty. In formal terms, the probability of an event is a number between 0 and 1, where 0 indicates that the event is impossible and 1 indicates that the event is certain. Probabilities between 0 and 1 represent the degree of uncertainty associated with the event.
Here,
The probability that the first n coupons collected do not form a complete set can be found as follows:
Let S be the event that the first n coupons do not form a complete set, and let Ci be the event that the i-th coupon collected is a new type (i.e., a coupon of a type that has not been collected before).
Then, the event S can be expressed as the intersection of the events C1, C2, ..., Cn, where each Ci is independent of the others and has probability (c-i+1)/c of occurring. This is because there are c-i+1 types of coupons remaining after i-1 types have been collected, and each of these types is equally likely to be the next coupon collected.
So, the probability of S can be calculated as:
P(S) = P(C1 ∩ C2 ∩ ... ∩ Cn) = P(C1) × P(C2) × ... × P(Cn)
= (c-1)/c × (c-2)/c × ... × (c-n+1)/c
= Π(i=1 to n) (c-i+1)/c
To deduce an expression for the mean number of coupons you will need to collect before you have a complete set, let X be the random variable representing the number of coupons collected until a complete set is obtained. Then, the expected value of X can be calculated using the formula:
E(X) = Σ(k=1 to c) P(X ≥ k)
This formula sums the probabilities of all possible numbers of coupons collected until a complete set is obtained, weighted by their respective probabilities.
Note that P(X ≥ k) is the probability that a complete set has not been obtained after k-1 coupons have been collected, which is equal to the probability of the event S above. So, we can substitute the expression for P(S) into the formula for E(X) to get:
E(X) = Σ(k=1 to c) P(X ≥ k)
= Σ(k=1 to c) Π(i=1 to k-1) (c-i+1)/c
= Σ(k=1 to c) Π(i=0 to k-2) (c-i)/c
= Σ(k=0 to c-1) Π(i=0 to k-1) (c-i)/c (by changing the index of summation)
= Σ(k=0 to c-1) (c-k)/cˣ
= c Σ(k=0 to c-1) (1/c)ˣ - Σ(k=0 to c-1) (k/c)ˣ
= c (1 - (1/c)ˣ)/(1 - 1/c) - B(c, 1/c)
where B(c, 1/c) is the sum of the first c terms of the series (k/c)ˣ.
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Is ABES AGES? If so, identify the similarity postulate or theorem that
applies.
B
40 40
6
S
G
A. Similar - AA
B. Similar - SSS
C. Similar - SAS
D. Cannot be determined
Answer:
Step-by-step explanation:
similar - AA
The ΔBES is similar to ΔGES by AA similarity postulate.
What are Similar Triangles?Similar triangles are those triangles, where the angles of the triangles are equal and the sides are proportional.
Given a bigger triangle BEG.
There are two smaller right angled triangles BES and GES.
For ΔBES, ∠BES = 40° and ∠BSE = 90°
For ΔGES, ∠GES = 40° and ∠GSE = 90°
By AA similarity postulate, if two angles of one triangle is equal to two angles of another triangle, then the triangles are similar.
Here, two angles of ΔBES is equal to two angles of ΔGES.
So two triangles are similar.
Hence the two triangles are similar by AA similarity postulate.
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Your question is incomplete. The complete question with the image of the triangle is as given below.
Find the intercepts of the parabola y = x² - 4x - 12. Give exact answers and simplify any fractions.
The intercepts of the parabola are A ( 6 , 0 ) and B ( -2 , 0 ) and the y intercept of the parabola is ( 0 , -12 )
What is a Parabola?A Parabola, open curve, a conic section produced by the intersection of a right circular cone and a plane parallel to an element of the cone. A parabola is a plane curve generated by a point moving so that its distance from a fixed point is equal to its distance from a fixed line
The equation of the parabola is given by
( x - h )² = 4p ( y - k )
y = a ( x - h )² + k
where ( h , k ) is the vertex and ( h , k + p ) is the focus
y is the directrix and y = k – p
The equation of the parabola is also given by the equation
y = ax² + bx + c
where a , b , and c are the three coefficients and the parabola is uniquely identified
Given data ,
Let the equation of the parabola be represented as A
Now , the value of A is
y = x² - 4x - 12 be equation (1)
On simplifying , we get
when y = 0
x² - 4x - 12 = 0
On factorizing the quadratic equation , we get
x² - 6x + 2x - 12 = 0
( x + 2 ) ( x - 6 ) = 0
So , the two values of x are
when ( x + 2 ) = 0
x = -2
And , when ( x - 6 ) = 0
x = 6
So , the x intercepts of the parabola are A ( 6 , 0 ) and B ( -2 , 0 )
The y intercept is when x = 0
So , y = 0 - 0 - 12
y = -12
And , the y intercepts of the parabola are ( 0 , -12 )
Hence , the intercepts of the parabola are solved
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two triangles are similar if they have two corresponding angles that are congruent or equal in measure
Your statement is partially correct congruent .
Two triangles are similar if they have all three corresponding angles congruent or equal in measure, or if they have two corresponding angles congruent and the corresponding sides are in proportion (i.e., the ratio of the length of one side to the length of the corresponding side in the other triangle is constant). This is known as the Angle-Angle Similarity Theorem (AA Similarity), or the Angle-Side-Angle Similarity Theorem (ASA Similarity).
It is important to note that if only one pair of corresponding angles is congruent, the triangles are not necessarily similar. For example, two right triangles with one acute angle congruent are not necessarily similar, since the other acute angles are not congruent. Similarly, if two triangles have all three sides in proportion, they are not necessarily similar unless all three corresponding angles are also congruent.
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please help me please
The values of x and y are x = 6 and y = 3√5
How to determine the values of x and yTriangle 1
From the question, we have the following parameters that can be used in our computation:
The right triangle where one of the angles is 45 degree
This is a special triangle such that
Hypotenuse = Legs * √2
So, we have
x = 3√2 * √2
Evaluate
x = 6
Triangle 2
Here, we have:
The right triangle where one of the angles is 60 degrees
So, we have
cos(60) = y/6√5
This gives
y = 6√5 * cos(60)
Evaluate
y = 3√5
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question at position 9 an individual has been driving a passenger vehicle to work, averaging 60 miles a week in a car that averages 22 miles per gallon. the individual plans to purchase a hybrid vehicle that averages 50 miles per gallon. if the individual drives to work
Using arithmetic operations the individual would save approximately 76.36 gallons of gas per year by switching to a hybrid car for their commute.
What is arithmetic operation?
A subject of mathematics known as arithmetic operations deals with the study and use of numbers in all other branches of mathematics. Basic operations including addition, subtraction, multiplication, and division are included.
Let's first calculate the annual distance driven by the individual to work.
Use arithmetic operation of multiplication.
Annual distance driven = 60 miles/week x 50 weeks/year = 3000 miles/year
Now, let's calculate how much gas the individual would use for their commute in their current car.
Use arithmetic operation of division.
Gas used in current car = (Annual distance driven) / (Miles per gallon of current car)
Gas used in current car = 3000 miles/year / 22 miles/gallon = 136.36 gallons/year
Next, let's calculate how much gas the individual would use for their commute in a hybrid car.
Use arithmetic operation of division.
Gas used in hybrid car = (Annual distance driven) / (Miles per gallon of hybrid car)
Gas used in hybrid car = 3000 miles/year / 50 miles/gallon = 60 gallons/year
Finally, let's calculate how much gas the individual would save by switching to a hybrid car.
Use arithmetic operation of subtraction.
Gas saved = Gas used in current car - Gas used in hybrid car
Gas saved = 136.36 gallons/year - 60 gallons/year = 76.36 gallons/year
Therefore, the amount of gas value saved is 76.36 gallons of gas per year.
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An individual has been driving a passenger vehicle to work, averaging 60 miles a week in a car that averages 22 miles per gallon. The individual plans to purchase a hybrid vehicle that averages 50 miles per gallon. If the individual drives to work 50 weeks a year, how much gas will they save if they switch to a hybrid vehicle for their commute?
On land a turtle travels at a constant speed of 3/5 mile in 1/4 of an hour. What is the turtles speed in miles per hour?
The required turtle's speed is 12/5 miles per hour, as of the given condition.
What is speed?Speed is defined as when an object is in motion, the distance covered by that object per unit of time is called speed.
Here,
To find the turtle's speed in miles per hour, we need to convert the fraction of miles traveled in a fraction of an hour to miles per hour.
First, we can simplify the fraction 3/5 by dividing the numerator and denominator by 1/4,
speed = distance/time
Substitute the value in the above expression,
Speed = 3/5 / [1/4]
Speed = 12/5
Therefore, the turtle's speed is 12/5 miles per hour.
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write a function that decreases by 12% every time x increases by 1.
A function that decreases by 12% every time x increases by 1 is,
y = 100(1 -0.12)ˣ.
What is exponential decay?An exponential function's curve is created by a pattern of data called exponential decay, which exhibits higher decreases over time.
The exponential decay function:
Aₙ = A₀(1-r)ˣ, where y = Final amount, A₀ = Initial amount, r = Rate of decay in decimal form, x = Time.
An exponential decay function is represented by the following equation,
y = a(1 -r)ˣ.
Here, a = 100.
And the function decreases by 12%.
So,
100 - 12 = 88
In decimals, 88 = 0.88.
So, y = 100(1 -0.12)ˣ.
Therefore, the function is y = 100(1 -0.12)ˣ.
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