Answer:
Option 3) We reject the null hypothesis with one tail test and accept the null hypothesis with two tail test.
Step-by-step explanation:
We are given the following information:
n = 16
[tex]t_{statistic} = 1.94[/tex]
[tex]\alpha = 0.05[/tex]
Now,
Right One-tail Test
[tex]t_{critical} \text{ at 0.05 level of significance, 15 degree of freedom } = 1.753[/tex]
[tex]t_{stat} > t_{critical}[/tex]
We reject the null hypothesis in this case.
Two-tail Test
Now, [tex]t_{critical} \text{ at 0.05 level of significance, 9 degree of freedom } = \pm 2.131[/tex]
[tex]-2.131 < t_{stat} < 2.131[/tex]
We accept the null hypothesis in this case.
Option 3) We reject the null hypothesis with one tail test and accept the null hypothesis with two tail test.
The correct decision for this hypothesis test is to reject the null hypothesis with a one-tailed test but fail to reject with two tails.
Explanation:To make a decision in a hypothesis test, we compare the t statistic to the critical value. In this case, the t statistic is 1.94. Since the treatment is expected to increase scores and the sample mean shows an increase, we are conducting a one-tailed test. Looking at the critical value for a = 0.05 for a one-tailed test using the t15 distribution, we find that it is 1.753. Since the t statistic (1.94) is greater than the critical value (1.753), we reject the null hypothesis. Therefore, the correct decision for this hypothesis test is to reject the null hypothesis with a one-tailed test but fail to reject with two tails.
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Sonya drops a marble while standing on a deck 7 7/8 feet above the ground. The marble falls 4 1/4 feta from Sonya's hand to the deck, and then rolls and falls to the ground. What is the total vertical distance that the marble falls?
Answer: just subtract 7 7/8 - 4 1/4 :)
Step-by-step explanation:
The distance that we can say that the marbel has fallen through is 3 5/8 feet
What is the distance of the fall?To subtract fractions, the denominators (the bottom numbers) of the fractions you're subtracting must be the same. If they're not already the same, you'll need to find a common denominator. If the fractions have different denominators, convert both fractions to an equivalent fraction
We have that;
Distance dropped = 7 7/8
Distance where the fall stopped = 4 1/4
Distance of the fall = 7 7/8 - 4 1/4
3 7 - 2/8
= 3 5/8 feet
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What is the degree of the polynomial 5a6bc2+8d5+7e6f2−10g4h7 ? Enter your answer in the box.+
Answer:
11
Step-by-step explanation:
The degree of a polynomial is he highest of the degrees of its monomials (individual terms) with non-zero coefficients.
You are given the polynomial
[tex]5a^6bc^2+8d^5+7e^6f^2-10g^4h^7[/tex]
It consists of 4 terms:
[tex]5a^6bc^2[/tex][tex]8d^5[/tex][tex]7e^6f^2[/tex][tex]-10g^4h^7[/tex]The degrees are:
of the first term is [tex]6+1+2=9[/tex]of the second term is [tex]5[/tex]of the third term is [tex]6+2=8[/tex]of the fourth term is [tex]4+7=11[/tex]The greatest degree is 11.
Answer:
11
Step-by-step explanation:
I did the quiz
A local technical school has 856 students. They expect 700 guests for a special speaker. The custodian has set up 1,500 chairs. How many more chairs are needed if all visitors and students are to have seats?
Answer:
56 chairs
Step-by-step explanation:
856+700=1556 <--- expected count
chairs set up= 1500
1556-1500= 56 more chairs
Answer: A.) 56 more
Step-by-step explanation:
Use the discriminant to describe the roots of each equation. Then select the best description.
x^2 - 4x + 4 = 0
double root
real and rational root
real and irrational root
imaginary root
Answer:
Hello My Friend! The correct answer its double root.
Step-by-step explanation:
In this equation, if we applie the a, b and c coefficients (a=1, b=4, c=4) ind the Bhaskara, the final result will be 4 for both cases. x'=4 and x''=4. It happens because the number of theta is equal to 0. So, both roots will be the same number.
A choir director at your school wants to divide the choir into smaller groups there are 24 sooranos 60 altos and 36 tenors . Each group will have the same number of each type of voice what is the greast number of tje group that can be formed
Answer:
The question has a typo in it...so if you mean least: 2 groups......greatest: 12
Step-by-step explanation:
Least:
24, 60, and 36 are all even numbers, so they can divide by 2 so each group would have 12 Sopranos, 30 Altos, and 18 tenors.
Greatest:
24, 60, and 36 can all be divided by 12. So, each group would have 2 Sopranos, 5 altos, amd 4 tenors.
The greatest number of the group that can be formed is 12.
Based on the information given in the question, in order to solve the question, we'll have to find the factors of the numbers given and this will be:
24 = 1, 2, 3, 4, 6, 8, 12, and 24.
36 = 1, 2, 3, 4, 6, 9, 12, 18, and 36
60 = 1, 2, 3, 4, 5, 6, 10, 12, 15, 20, 30, and 60.
Therefore, from the numbers given above, we can see that the greatest number that's common to all is 12.
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Suppose you have two 100 mL graduated cylinders. In each cylinder, there is 40.0 mL of water. You also have two cubes: one is lead, and the other is aluminum. Each cube measures 2.90 cm on each side. After you carefully lower each cube into the water of its own cylinder, what will the new water level be in each of the cylinders?
Answer:64.389
Step-by-step explanationthe new volume in each cylinder will be the volume of water + volume 1 cube (assuming the cubes does not float on water)
then volume of a cube =side^3=(2.90 cm)^3= 24.389cm^3=24.389mL
(considering that 1 ml= 1 cm^3)
Finally the new level of each cylinder is=40 mL+24.389mL=64.389 mL
(if the cube float we need to consider the volume under water (with densities which are not given)
The fraction of defective integrated circuits produced in a photolithography process is being studied. A random sample of 300 circuits is tested, revealing 14 defectives. Calculate a 95% two-sided confidence interval on the fraction of defective circuits produced by this particular tool. Round the answers to 4 decimal places.
Answer: [tex](0.0228\ ,0.0706)[/tex]
Step-by-step explanation:
Given : Sample size : n= 300
The sample proportion of defectives : [tex]\hat{p}=\dfrac{14}{300}=0.0467[/tex]
Significance level for 95% confidence level =[tex]\alpha=1-0.95=0.05[/tex]
Critical z-value:[tex]z_{\alpha/2}=\pm1.96[/tex]
Confidence interval for population proportion :
[tex]\hat{p}\pm z_{\alpha/2}\sqrt{\dfrac{\hat{p}(1-\hat{p})}{n}}[/tex]
[tex]= 0.0467\pm (1.96)\sqrt{\dfrac{0.0467(1-0.0467)}{300}}[/tex]
[tex]\approx\ 0.0467\pm 0.0239\\\\=(0.0467-0.0239\ , \ 0.0467-0.0239)\\\\=(0.0228\ ,0.0706)[/tex]
Hence, a 95% two-sided confidence interval on the fraction of defective circuits produced by this particular tool= [tex](0.0228\ ,0.0706)[/tex]
In a lottery 5 different numbers are chosen from the first 90 positive integers. How many outcomes are there with the property that the last digits of all five numbers are different? (The last digit of 5 is 5 and the last digit of 34 is 4).
Answer:
There are 1752574320 outcomes
Step-by-step explanation:
The option are:
1 11 21 31 41 51 61 71 81 91
2 12 . . . . . . . .
3 13 . . . . . . . .
4 14 . . . . . . . .
5 15 . . . . . . . .
6 16 . . . . . . . .
7 17 . . . . . . . .
8 18 . . . . . . . .
9 19 . . . . . . . .
10 20 . . . . . . . .
So we have to select 5 numbers, with the property that the last digits of all five numbers are different
__ __ __ __ __
1. Have 90 options
⇒ 90
2. Have 90 - 9 options (e.g. if 2 was the first chosen number, then you can't select more 2, 12, 22, 32, 42, 52, 62, 72 or 82 )
⇒ 90 - 9 = 81
3. Have 90 - 9 that can't no be chosen more because share the same last number as the first number - 9 that can't no be chosen more because share the same last number as the second number
⇒ 90 - 9 - 9 = 72
4. Have 90 - 9 that can't no be chosen more because share the same last number as the first number - 9 that can't no be chosen more because share the same last number as the second number - 9 that can't no be chosen more because share the same last number as the third number
⇒ 90 - 9 - 9 - 9 = 63
5. Have 90 - 9 that can't no be chosen more because share the same last number as the first number - 9 that can't no be chosen more because share the same last number as the second number - 9 that can't no be chosen more because share the same last number as the third number - 9 that can't no be chosen more because share the same last number as the fourth number
⇒ 90 - 9 - 9 - 9 - 9 = 54
So now the number of possible combination with the given restriction is equal to the multiplication of the amount of option for the selection of each number (90 for the selection of the first, 81 for the selection of the second, 72 for the selection of the third number, 63 for the selection of the fourth and 54 for the selection of the fifth)
C= 90*81*72*63*54 = 1752574320
There are 1752574320 outcomes
Final answer:
There are 30,240 outcomes with the property that the last digits of all five numbers are different.
Explanation:
To calculate the number of outcomes with the property that the last digits of all five numbers are different, we need to consider each digit separately. For the first number, we have 10 choices (0-9), for the second number, we have 9 choices (since the last digit of the first number is taken), for the third number, we have 8 choices, and so on.
Therefore, the total number of outcomes is:
10 x 9 x 8 x 7 x 6 = 30,240.
12. The geographic grid apportions the globe into hemispheres of 180 lines of longitude. Based on your knowledge of basic geometry, what portion of a sphere does 180 degrees equal? __________________ The grid also defines so-called "central meridians" centered on every 15 degrees of longitude. How many central meridians would there be for a complete sphere? ________________________ Compare this answer to the number of hours in a day. How does it compare?
Answer:
For the first question, 180 degrees equals to a half of the sphere. For the second question, you need 24 central meridians for a complete sphere, which are exactly the hours in a day.
Step-by-step explanation:
A sphere is basically a 3D circle. As a circle has 360 degrees, 180 degrees would be half of a circle. Imagine you are on a satellite over the north pole or the south pole and you have a way to cut the earth by the middle. You will get two halves of sphere.
About the second question, you may need to have in mind that a day is the time spent for the earth to rotate all 360 degrees over its own axis. British fellow, on XIX century, decided they were the center of the world. As previously, back in the days, some other people decided a day had 24 hours, they decided to draw this lines and divide the earth in 24 pieces, so they could knew which time was on every point their extense kingdom had. As I said, a circle has 360 degrees, (360 degrees)/(24 hours) equals to 15 degrees.
What is the least angle measure by which this figure can be rotated so that it maps onto itself?
45°
90°
180°
360°
Answer:
The correct answer is 90
Step-by-step explanation:
Amelia used 6 liters for gasoline to drive 48 kilometers How many kilometers did Amelia drive per liter? At that rate, how many liters does it take to drive 111 kilometer?
Amelia drive 8 kilometers per liter.
13.875 liters needs to drive 111 kilometers.
How many kilometers did amelia drive per liter ?Amelia used 6 liters for gasoline to drive 48 kilometers.
Here we have to find how many km she drive per liter.
Amelia used 6 liters to drive 48 kilometers
Amelia used 1 liter to drive 48/6 kilometers = 8 kilometers
Therefore, Amelia drive 8 kilometers per liter.
Now, to travel 8 kilometers, she needs 1 liter gasoline
To travel 1 kilometer, she needs 1/8 liter gasoline
To travel 111 kilometers, she needs 111/8 liters gasoline = 13.875 liters
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The angles of a triangle are 120 degrees. (x + 16) degrees, and X degrees.
What is the value of x?
Answer:
x = 22
Step-by-step explanation:
Adding all the degrees to a triangle must equal 180
120 + (x+16) + x = 180
2x + 136 = 180
-136. -136
2x = 44
[tex]\frac{2x}{2} = \frac{44}{2}[/tex]
x = 22
Final answer:
To find the value of x in the triangle with given angles, apply the rule that the sum of a triangle's interior angles is 180 degrees.
Explanation:
The value of x can be found by using the fact that the sum of the interior angles of a triangle is 180 degrees.
Angles of the triangle are given as 120 degrees, (x + 16) degrees, and x degrees.
Setting up the equation: 120 + (x + 16) + x = 180 and solving for x gives x = 22 degrees.
-7y-4x=1
7y-2x=53
solve for system of equations
Answer:
x = -9
y = 35/7
Step-by-step explanation:
Given equations :-
-7y - 4x = 1 ....... ( i )
7y - 2x = 53 ........ ( ii )
From ( i )
-7y = 1 + 4x
[tex]y = \frac{ - (1 + 4x)}{7} [/tex]
..........( iii )
From ( ii )
7y - 2x = 53
7y = 53 + 2x
[tex]y = \frac{53 + 2x}{7} [/tex]
.......( iv )
Equating both ( iii ) & ( iv )
y = y
[tex] \frac{ - (1 + 4x)}{7} = \frac{53 + 2x}{7} [/tex]
-(1 + 4x ) = 53 + 2x
-1 -4x = 53 + 2x
-1 - 53 = 2x + 4x
-54 = 6x
-54/6 = x
-9 = x
Also,
[tex]y = \frac{ - (1 + 4x)}{7 } \\ \\ y = - \frac{(1 + 4( - 9))}{7} [/tex]
[tex]y = - \frac{ (1 - 36)}{7} \\ \\ y = - \frac{( - 35)}{7} \\ \\ y = \frac{35}{7} [/tex]
A bag contains 99 red marbles and 99 blue marbles. Taking two marbles out of the bag, you:
• put a red marble in the bag if the two marbles you drew are the same color (both red or both
blue), and
• put a blue marble in the bag if the two marbles you drew are different colors.
Repeat this step (reducing the number of marbles in the bag by one each time) until only one
marble is left in the bag. What is the color of that marble?
The final marble left in the bag will be red.
Let, analyze the process step by step:
Initially, the bag contains 99 red marbles and 99 blue marbles.
When you take two marbles out of the bag, there are two possibilities: either you get two red marbles or two blue marbles, or you get one red and one blue marble.
a. If you get two marbles of the same color (both red or both blue), you put a red marble in the bag.
b. If you get one red and one blue marble, you put a blue marble in the bag.
After putting a marble back in the bag, you have one less marble in the bag.
You repeat this process, reducing the number of marbles in the bag by one each time, until only one marble is left in the bag.
Now, let's think about the outcomes at each step:
If the bag contains an odd number of marbles (99 red + 99 blue = 198), the final marble will be red because at each step, you are adding a red marble back to the bag.
If the bag contains an even number of marbles (e.g., 100 red + 100 blue = 200), the final marble will be blue because at each step, you are adding a blue marble back to the bag.
In this case, the bag contains 99 red marbles and 99 blue marbles, which is an odd number (198 marbles).
Therefore, the final marble left in the bag will be red.
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A sample of n = 9 college students is used to evaluate the effectiveness of a new Study Skills Workshop. Each student’s grade point average (GPA) is recorded for the semester before the workshop and for the semester after the workshop. The average GPA improved by MD = 0.60 points with s2 = 0.09. The researcher would like to use the sample to estimate how much effect the workshop would have for the entire college population. Which of the following is the 80% confidence interval for these data?
A) μD = 0.60 ± 0.09( 1.860)
B) μD = 0.60 ± 0.10(1.397)
C) μD = 0.60 ± 0.01(1.397)
D) μD = 0.60 ± 0.10( 1.860)
Answer:
B) μD = 0.60 ± 0.10(1.397)
Step-by-step explanation:
The confidence interval is given by:
[tex]MD±t_{\alpha/2, n-1} \frac{s}{\sqrt{n} }[/tex]
Where
MD=60
n=9
df=n-1=8
[tex]t_{\alpha/2, n-1}=1.397[/tex]
[tex]s=\sqrt{0.09} =0.3[/tex]
Then the confidence interval is
μD=0.60±1.397*(0.3/√9)
μD=0.60±0.10*(1.397)
During the year, FastDry Corporation has $ 340,000 in revenues, $ 155,000 in expenses, and $ 12,000 in dividend declarations and payments. Net income for the year was:
Answer:
$185,000
Step-by-step explanation:
We have been been given that during the year, Fast Dry Corporation has $ 340,000 in revenues, $ 155,000 in expenses, and $ 12,000 in dividend declarations and payments.
We will use following formula to solve our given problem.
[tex]\text{Net income}=\text{Revenues}-\text{Expenses}[/tex]
[tex]\text{Net income}=\$340,000-\$155,000[/tex]
[tex]\text{Net income}=\$185,000[/tex]
Therefore, the net income for the year was $185,000.
What is an extraneous solution? a solution that was found due to an arithmetic error a solution that satisfies the original equation an apparent solution that is not a real number an apparent solution that does not satisfy the original equation
Answer:
an apparent solution that does not satisfy the original equation
Step-by-step explanation:
Usually, an extraneous solution is introduced by the solution process. Sometimes it takes the form of multiplying an equation by 0, often the result of eliminating the denominators of rational functions.
Other times, it takes the form of adding branches to a function that are unintended or undefined. (Squaring a square root will often introduce "solutions" that require the square root to be a negative value.) The attached graph shows that x=4 is an extraneous solution to ...
√x = x-6
It shows up when the equation is squared:
x = x² -12x +36 ⇒ (x -9)(x -4) = 0
The "solution" x=4 is extraneous because it does not satisfy the original equation.
As in this graphed example, using graphical methods to find solutions can often avoid extraneous solutions.
Answer:
an apparent solution that does not satisfy the original equation
Step-by-step explanation:
This is due tomorrow, so please help and show step by step
Answer:
slope = 3/2y-intercept = 3x-intercept = -2Step-by-step explanation:
The slope is the coefficient of x when the equation is of the form ...
y = (something).
Here, we can put the equation in that form by subtracting 12x and dividing by the coefficient of y:
12x -8y = -24 . . . . . given
-8y = -12x -24 . . . . .subtract 12x
y = 3/2x +3 . . . . . . . divide by -8
This is the "slope-intercept" form of the equation. Generically, it is written ...
y = mx + b . . . . . . where m is the slope and b is the y-intercept
So, the above equation answers two of your questions:
slope = 3/2
y-intercept = 3
__
The x-intercept is found fairly easily from the original equation by setting y=0:
12x = -24
x = -24/12 = -2 . . . . . the x-intercept
_____
A graph of the equation can also show you these things. The graph shows a rise of 3 units for a run of 2, so the slope is rise/run = 3/2. The line crosses the axes at x=-2 and y=3, the intercepts.
FAST HELp Which transformation carries the trapezoid onto itself?
Question 2 options:
reflect over the line x = –3
reflect over the line y = –3
reflect over the line y = 3
reflect over the line x = 3
Good morning ☕️
______
Answer:
reflect over the line y = –3
____________________
Step-by-step explanation:
Look at the photo below for more details.
:)
Answer: the answer is y=-3
Step-by-step explanation: I just answer this question and my quiz
And also -3 is what divided the trapezoid
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Which inequality's solution is graphed here?
A)
x - 8 < 6
B)
x + 8 < 6
C)
x - 8 < 2
D)
x - 8 < -6
Answer:
c
Step-by-step explanation:
Answer:
Step-by-step explanation:
dapends on what x is but i think the answer is A or D
Consider the function represented by the equation y minus 6 x minus 9 = 0. Which answer shows the equation written in function notation with x as the independent variable?
Answer:
[tex]f(x)=6x+9[/tex]
Step-by-step explanation:
Functions have independet variables(the value of the variable could be any number, we have no restrictions) and dependent variaariables(the values of this variables depends of idependent variables)
the problem says that x is the independent variable, so we say that y is a dependent variable. Dependent need to be replaced by funcion notation, in this case we use y=f(x)
So we raplace it in the equation and we have:
[tex]f(x)-6x-9=0[/tex]
we solve for f(x) passing -6x and -9 to the right side and changing the signs, and we get:
[tex]f(x)=6x+9[/tex]
Answer:
f(x) = 6x + 9
Step-by-step explanation:
The question is not complete because the are no option to pick from. This is the complete question.
Consider the function represented by the equation y minus 6 x minus 9 = 0. Which answer shows the equation written in function notation with x as the independent variable?
f of x = 6 x + 9
f of x = one-sixth x + three-halves
f of y = 6 y + 9
f of y = one-sixth y + three-halves
writing this in as a function
[tex]f(x)-6x-9=0[/tex]
the question is asking us to write the function in such a way that x is the independent variable
[tex]f(x)=6x-9[/tex]
here x is the dependent variable
to make x independent, we need to solve for x
[tex]-9=6x\\[/tex]
divide both sides by 6 to make x independent
[tex]\frac{-9}{6} =x\\\\\\\x=\frac{-3}{2}[/tex]
Axline Computers manufactures personal computers at two plants, one in Texas and the other in Hawaii. The Texas plant has 40 employees; the Hawaii plant has 20. A random sample of 10 employees is to be asked to fill out a benefits questionnaire.
a. What is the probability that none of the employees in the sample work at the plant in Hawaii?
b. What is the probability that one of the employees in the sample works at the plant in Hawaii?
c. What is the probability that two or more of the employees in the sample work at the plant in Hawaii?
d. What is the probability that nine of the employees in the sample work at the plant in Texas?
Final answer:
The probability that no employee in the sample work at the plant in Hawaii is 0.0279, the probability that one of the employees in the sample works at the plant in Hawaii is 0.2656, the probability that two or more of the employees in the sample work at the plant in Hawaii is 0.7065, and probability that nine of the employees in the sample work at the plant in Texas is 0.06.
Explanation:
To find the probability that none of the employees in the sample work at the plant in Hawaii, we need to find the probability of selecting 0 employees from the Hawaii plant out of a total sample size of 10 employees. Since there are 20 employees at the Hawaii plant and 60 employees in total, the probability is:
P(selecting 0 employees from Hawaii) = (20C0 * 40C10) / (60C10) = 0.0279
To find the probability that one of the employees in the sample works at the plant in Hawaii, we need to find the probability of selecting 1 employee from the Hawaii plant out of a total sample size of 10 employees. The probability is:
P(selecting 1 employee from Hawaii) = (20C1 * 40C9) / (60C10) = 0.2656
To find the probability that two or more of the employees in the sample work at the plant in Hawaii, we need to find the probability of selecting 2 or more employees from the Hawaii plant out of a total sample size of 10 employees. The probability is:
P(selecting 2 or more employees from Hawaii) = 1 - P(selecting 0 employees from Hawaii) - P(selecting 1 employee from Hawaii) = 1 - 0.0279 - 0.2656 = 0.7065
To find the probability that nine of the employees in the sample work at the plant in Texas, we need to find the probability of selecting 9 employees from the Texas plant out of a total sample size of 10 employees. The probability is:
P(selecting 9 employees from Texas) = (40C9 * 20C1) / (60C10) = 0.06
A school administrator will assign each student in a group of n students to one of m classrooms. If 3 < m < 13 < n, is it possible to assign each of the n students to one of the m classrooms so that each classroom has the same number of students assigned to it?A school administrator will assign each student in a group of n students to one of m classrooms. If 3 < m < 13 < n, is it possible to assign each of the n students to one of the m classrooms so that each classroom has the same number of students assigned to it?
Answer: So you have n students, where n>13, and m classrooms, where 3>m>13.
the question asked is: is it possible to assign each of the n students to one of the m classrooms so that each classroom has the same number of students assigned to it?
The only situation where it will be possible is when you take the total number of students, divide it by the number of classrooms and the result is a whole number ( because here we are working with students, you can't have a 2/5 of a student, for example)
So n/m must be a natural number.
So now suppose that n is prime, this is : n only can be divided by itself, an example of a prime number is 17.
so if you have n = 17 students, there is no m that divides 17 into a whole number, then in this case, you can't assign the same number of students to each classroom.
And because we find a counterexample, so it is not possible for every n and m, so the statement is false. ( independent of the fact that you actually could do this for some m and n given, the important thing here is that you can't do it for every combination of m and n)
Circle the function types that are both increasing & decreasing for the same function. Choose all that apply.
A. Linear functions
B. Constant functions
C. Quadratic functions
D. Exponential functions
E. Linear absolute value functions
Quadratic functions and linear absolute value functions can be both increasing and decreasing within the same function. Linear, constant and exponential functions do not exhibit this behaviour.
Explanation:In mathematics, a function can be both increasing and decreasing at different parts of its graph. This means that the function's value increases for some parts of the domain (the x-values) and decreases for others. Not every function type can show this behavior. Let's consider the options:
A. Linear functions: These are either increasing or decreasing over their entire domain, so they are not both.B. Constant functions: These do not increase or decrease; their value remains constant.C. Quadratic functions: Depending on the shape of the parabola (opens upward or downward), quadratic functions can be both increasing and decreasing.D. Exponential functions: These are typically either entirely increasing or entirely decreasing, not both.E. Linear absolute value functions: These functions increase or decrease until they reach the vertex (the point of absolute value), then change direction. So they can be both increasing and decreasing as well.Therefore, the function types that can be both increasing and decreasing within the same function are quadratic functions and linear absolute value functions.
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Yochanan walked from home to the bus stop at an average speed of 5 km / h. He immediately got on his school bus and traveled at an average speed of 60 km / h until he got to school. The total distance from his home to school is 35 km, and the entire trip took 1.5 hours.
Yochanan walked 5 km to the bus stop at 5 km/h and then took the bus for the remaining 30 km at 60 km/h, totaling 1.5 hours for his trip to school.
Explanation:The question involves calculating distances and times related to Yochanan's trip from home to school, requiring the application of speed, distance, and time relationships. Let's denote the distance from Yochanan's home to the bus stop as x kilometers and the remaining distance to school (35 - x) kilometers. Given the average speeds and the total trip time, we can set up equations to solve for x.
The time taken to walk to the bus stop is x / 5 hours, and the time taken to travel from the bus stop to school by bus is (35 - x) / 60 hours. The total trip time is 1.5 hours.
Therefore, the equation is:
x / 5 + (35 - x) / 60 = 1.5
Solving this equation:
Multiply through by 60 (LCM of denominators) to eliminate fractions: 12x + (35 - x) = 90Simplify and solve for x: 11x = 55Divide by 11: x = 5So, Yochanan walked 5 km to the bus stop. Using the distance to calculate times, he spent 1 hour on the bus and 0.5 hours walking.
Mike recently increased the size of his Jeep tires from the original 29 inch diameter to the larger 33.73 inch diameter. If Mike didn't recalibrate his speedometer, how fast is he really going on the new tires when his speedometer shows he is traveling 60 mph?
a. 54.5 mph
b. 62.1 mph
c. 66.1 mph
d. 69.8 mph
Answer:
d. 69.8 mph
Step-by-step explanation:
Since, the ratio of the diameter of the tyre of a vehicle and its speed must be constant,
Given,
The original diameter of the tyre = 29 inch,
Original speed = 60 mph,
Thus, the ratio of diameter and the speed of the vehicle = [tex]\frac{29}{60}[/tex]
New diameter of the tyre = 33.73 inch,
Let x be the new speed of the vehicle = [tex]\frac{33.73}{x}[/tex]
[tex]\implies \frac{29}{60}=\frac{33.73}{x}[/tex]
[tex]\implies x=\frac{33.73\times 60}{29}=69.79\approx 69.8\text{ mph}[/tex]
Hence, the actual speed of the vehicle would be 69.8 mph.
OPTION D is correct.
Given that a Disney character is chosen at random, what is the probability that the character is not a mouse?
The probability of choosing a Disney character that is not a mouse is 0.9 or 90%.
there are a total of 100 Disney characters, including Mickey Mouse, Minnie Mouse, and other mouse characters, summing up to 10 mice characters.
Therefore, the number of non-mouse characters is 100 - 10 = 90.
Total number of characters (N): 100
Number of mouse characters (M): 10
Number of non-mouse characters: N - M = 100 - 10 = 90
Probability of choosing a non-mouse character: (N - M) / N = 90 / 100 = 0.9
Thus, the probability that the randomly chosen Disney character is not a mouse is 0.9 or 90%.
The complete question is "Given that a Disney character is chosen at random, what is the probability that the character is not a mouse? If there are 100 Disney charater out of which 10 are mice chracter "
What single transformation rule would be the same as a reflection across the line y = 5 and then across the line y = –2 (Hint: The reflection is going down)? Group of answer choices (x, y) → (x – 14, y) (x, y) → (x +14, y) (x, y) → (x, y – 14) (x, y) → (x, y + 14)
Answer:
(x, y) → (x, y – 14)
Step-by-step explanation:
There is only one answer choice that translates downward, adding a negative number to the y-value:
(x, y) → (x, y – 14)
Mr. Khans is buying staplers for his office. Each stapler costs $16.99. Part A: What does his final total cost depend upon? Part B: In this scenario, what is the input? What is the output?
Answer:
his cost depends on how many staplers he gets and the input is how much each stapler cost and output is how much he has to spend
Step-by-step explanation:
Answer:
A. Number of staplers.
B. Input is number of staplers and output is total cost.
Step-by-step explanation:
Part A : Let he bought x staplers,
∵ The cost of each stapler = $ 16.99
So, the cost of x staplers in dollars ( say y ) = price of each staplers × number of staplers
⇒ y = 16.99x
Which is the required equation that shows the given scenario,
∵ y ∝ x,
I.e. his final cost would depend upon the number of staplers.
Part B :
∵ in the equation y = 16.99x
x = input value, y = output value,
Thus, in this scenery, input is the number of staplers and output is total cost.
It takes 11 widgets to assemble one motor. Your team can assemble four motors in one day if you need to order parts for next week 5 working days how many widgets should you order?
Answer:
not 55
Step-by-step explanation:
Answer:
220
Step-by-step explanation: