You would need to buy 4 liters of stain to cover a wheelchair ramp with an area of 100 square feet.
Dimensional analysisThe answer to this question depends on the dimensions of the wheelchair ramp and how much area needs to be covered with stain.
Assuming that the wheelchair ramp has an area of 100 square feet, and that the stain coverage is similar to the area covered by paint, then the amount of stain required can be estimated by using the following formula:
Amount of stain (in liters) = Area to be covered (in square feet) ÷ Coverage per liter (in square feet per liter)
If the stain coverage is 25 square feet per liter, then the amount of stain required to cover 100 square feet would be:
Amount of stain = 100 ÷ 25 = 4 liters
Therefore, you would need to buy 4 liters of stain to cover a wheelchair ramp with an area of 100 square feet.
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Destiny checked the remaining stock for each garment sold at the store where she worked.
For 7 garments, there remained:
5 items 4 items 5 items 3 items 8 items 5 items 5 items
What was the mean amount of remaining stock?
The mean of the remaining stock is 5
How to find the meanTo find the mean amount of remaining stock, we need to add up the amounts of remaining stock for each garment and divide by the total number of garments.
So, we can start by adding up the amounts of remaining stock:
5 + 4 + 5 + 3 + 8 + 5 + 5 = 35
Now we can divide by the total number of garments (which is 7) to find the mean:
35 / 7 = 5
Therefore, the mean amount of remaining stock is 5.
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Tom is a supermarket manager. He reviewed transaction time when a customer paid by credit card. The
transaction time is normally distribution with mean of 20 seconds and standard deviation of 5 seconds.
(a) For a group of 6 customers, find the probability that 5 customers can finish the transaction within 20
seconds. (Assume that the transaction times of customers are independent.)
After discussion with the network provider, he will upgrade the network so that it is promised that each
transaction time can be reduced by 15%.
(b) Use Y to denote the transaction time after network upgrade. Find the mean and standard deviation of Y.
(c) Calculate the 97th percentile of Y. (i.e. find the value of t such that P(Y
(d) Compare with the transaction time before upgrade, is it (I) a higher proportion, (II) a lower proportion,
or (III) the same proportion of all customers can finish the transaction within 20 seconds? (Just state
your answer, no calculation is needed.)
Answer:
Step-by-step explanation:
(a) We can use the standard normal distribution to solve this problem. We first need to standardize the distribution by using the formula:
Z = (X - μ) / σ
where X is the transaction time, μ is the mean, σ is the standard deviation, and Z is the standard normal variable.
For 5 customers to finish the transaction within 20 seconds, we need to find the probability that 5 out of 6 customers have a transaction time less than or equal to 20 seconds. We can use the binomial distribution to find this probability:
P(X = 5) = 6C5 * (0.5)^5 * (0.5)^1 = 0.2344
where 6C5 is the number of ways to choose 5 customers out of 6.
(b) After the network upgrade, the transaction time will be reduced by 15%, so the new mean and standard deviation are:
μ' = 0.85 * μ = 17 seconds
σ' = 0.85 * σ = 4.25 seconds
(c) To find the 97th percentile of Y, we need to find the value of t such that P(Y ≤ t) = 0.97. Since Y is a normally distributed variable, we can standardize it using the formula:
Z = (Y - μ') / σ'
Then we can find the value of t using a standard normal distribution table or calculator:
Z = 1.88
t = μ' + Z * σ' = 17 + 1.88 * 4.25 = 25.99 seconds
(d) After the upgrade, a higher proportion of customers can finish the transaction within 20 seconds. This is because the mean transaction time has decreased from 20 seconds to 17 seconds, which means that more customers will have a transaction time less than or equal to 20 seconds.
The function f is defined by f(x) = −x³ + 3x²
6x and the point (1,-4) is on
the graph of f. If f-¹ is the inverse function of f, what is the value of (ƒ-¹)' (-4)?
-
The inverse function of f, what is the value of (ƒ-¹)' (-4) -1/16 ∓ i/(8√3)
We know that the point (1,-4) is on the graph of f, so we can use this information to find the value of x for which f(x) = -4:
-4 = -x³ + 3x² + (6x)
-x³ + 3x² + 6x + 4 = 0
We can solve this equation using various methods, such as graphing, factoring, or using the cubic formula. One possible method is to use synthetic division to test factors of the constant term (4) and find one that gives a remainder of zero. By testing -1 as a factor, we get:
-1 | 1 -3 6 4
-1 4 -10
1 -4 10 -6
Therefore, the equation can be factored as:
-(x + 1)(x² - 4x + 6) = 0
Using the quadratic formula or completing the square, we can find the roots of the quadratic factor:
x = 2 ± √2i
Since the function f is not one-to-one, we must restrict its domain to make it invertible. One possible domain is x ≤ 2, so the inverse function f⁻¹(x) is:
f⁻¹(x) = 1 ± √(1 - 2x)/x
Note that there are two possible values for f⁻¹(-4), one for each branch of the inverse function. To find the value of (f⁻¹)'(-4), we need to take the derivative of the inverse function at x = -4:
(f⁻¹)'(x) = -1/x² ∓ √(1 - 2x)/2x³
(f⁻¹)'(-4) = -1/16 ∓ i/(8√3)
Therefore, the value of (f⁻¹)'(-4) is either -1/16 - i/(8√3) or -1/16 + i/(8√3), depending on which branch of the inverse function we choose.
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Cole, a caterer, is investing some money in equipment and employees to help grow his business. Recently he spent $100 on equipment and hired a server who makes $16 per hour. Cole is hoping to make up these expense at the next job that is scheduled, which pays a base of $50 in addition to $18 per hour that the server works. In theory, this event could pay enough to cancel out Cole's expenditures. How much would the job pay? Write a system of equations, graph them, and type the solution.
The job would need to pay $500 to cover Cole's expenses.
What is probability?
Probability is a measure of the likelihood of an event occurring. It is a number between 0 and 1, where 0 means the event is impossible and 1 means the event is certain to happen.
Let's define some variables to represent the unknowns in this problem:
Let x be the number of hours that the server will work at the next job.
Let y be the total amount of money that Cole will make from the next job.
With these variables, we can set up a system of equations:
The cost of the equipment and server hire is $100 plus the server's hourly wage multiplied by the number of hours worked:
100 + 16x = total cost
The amount that Cole will make from the next job is the base pay of $50 plus the server's hourly wage multiplied by the number of hours worked:
y = 50 + 18x
We want to find the value of y that will make up for the $100 expense. In other words, we want to find the value of x that satisfies the equation:
total cost = y
Substituting the second equation into the first equation, we get:
100 + 16x = 50 + 18x
Solving for x, we get:
x = 25
Substituting x = 25 into the second equation, we get:
y = 50 + 18(25) = 500
Therefore, the job would need to pay $500 to cover Cole's expenses.
We can graph the two equations to visualize the solution:
y = 50 + 18x y = 100 + 16x
-------------------- --------------------
x = 0 | 50 | | 100 |
| | | |
| | | |
| | | |
| | | |
-------------------- --------------------
25 25
The point where the two lines intersect is (25, 500), which represents the solution to the system of equations.
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BRAINLIEST PLEASE ANSWER Use the form, ( the brackets mean absolute value) [x-b] <= c to write a absolute value inequality that has the solution set x<9 or x>=-5.
absolute value inequality |x - 2| <= 7 and (x <= 9 or x >= -5)
how to create an absolute value inequality?To create an absolute value inequality that has the solution set x < 9 or x >= -5, we first need to find the midpoint between -5 and 9, which is:
Midpoint = (-5 + 9) / 2 = 2
now, we need to find the distance between the midpoint and either endpoint.
Distance = |9 - 2| = 7
Now we can use the formula:
|x - b| <= c
where b is the midpoint and c is the distance.
putting the values we found,
|x - 2| <= 7
To get the solution set x < 9 or x >= -5, we can split this inequality into two parts:
x - 2 <= 7 or -(x - 2) <= 7
Simplifying each part, we get:
x <= 9 or x >= -5
Combining the two inequalities we get :
|x - 2| <= 7 and (x <= 9 or x >= -5)
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In Aspen Grove Park, 32 trees are over 15 feet tall. That is 40% of the trees in the park.
Shade the grid to show the percent of trees that are over 15 feet tall.
How many total trees are in the park? You can use your model to help.
trees
Submit HELP ME PLEASE THIS HW IS DUE IN TWO HRS
The trees in Aspen Grove Park are under 15 feet tall are 60%
the total number of trees in Aspen Grove Park, but we can find out that number by using the given percentage of trees that are over 15 feet tall.
To do this, we can use a proportion:
[tex]40/100 = 32/x [/tex]
Simplifying this, we can cross-multiply:
[tex]40x = 32 * 100 [/tex]
[tex]40x = 3200 [/tex]
[tex]x = 80[/tex]
So, there are a total of 80 trees in Aspen Grove Park.
Now, we can calculate the percentage of trees that are not over 15 feet tall by subtracting the percentage of trees that are over 15 feet tall from 100%:
[tex]100% - 40% = 60% [/tex]
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You select a card at random. The cards are labeled with the word “Probability” as seen below. Without replacing each card, you choose a second card.
The probability of selecting a vowel first and then not a vowel second is 2/6 x 5/5 = 10/30 = 1/3.
What is Probability?Probability is a branch of mathematics that deals with the likelihood of something happening. It is used to quantify the chance of a certain event occurring and can help to predict the outcome of a given situation. Probability is based on the concept of randomness, which is the idea that an event's outcome is determined by chance and cannot be controlled or predicted.
The word "replacement" contains 2 vowels (e,a) and 4 consonants (r,p,l,c). Therefore, the probability of selecting a vowel first is 2/6 (2 out of 6 cards are vowels). Since there are 5 cards left after the first selection, the probability of selecting a non-vowel second is 5/5 (5 out of 5 cards are non-vowels).
Therefore, the probability of selecting a vowel first and then not a vowel second is 2/6 x 5/5 = 10/30 = 1/3.
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Complete questions as follows-
You select a card at random from the cards that make up the word “replacement”. Without replacing the card, you choose a second card.
Find the probability of choosing a vowel and then not a vowel. There is 1 letter for each card.explain how you got the answer please?
create an expression to represent the Venn Diagram
An expression to represent the shaded region shown in the Venn diagram is AuB.
What is a Venn diagram?A Venn diagram is a visual tool used to show the similarities and differences between two or more sets of items or concepts. It consists of one or more overlapping circles, with each circle representing a set and the area where the circles overlap representing the intersection of the sets.
In this context, the symbol u represents the union between two or more of the circles. Based on this, the correct expression to represent the Venn diagram is AuB.
Note: This question is incomplete, below I attach the missing image:
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08.01 MC) Help ASAP!
The function h(x) is a continuous quadratic function with a domain of all real numbers. The table lists some of the points on the function.
x h(x)
−6 12
−5 7
−4 4
−3 3
−2 4
−1 7
What are the vertex and range of h(x)?
Vertex (−4, 4); Range ∞ ≤ y ≤ 4
Vertex (−4, 4); Range 4 ≤ y ≤ ∞
Vertex (−3, 3); Range 3 ≤ y ≤ ∞
Vertex (−3, 3); Range ∞ ≤ y ≤ 3
The vertex οf the parabοla is at the pοint (-3/2, -21/4) and the range οf the functiοn wοuld be (-21/4, infinity).
What is the quadratic functiοn?A quadratic functiοn is a functiοn οf the fοrm where a, b, and c are cοnstants, and a is nοt equal tο 0. It is a type οf pοlynοmial functiοn that can be graphed as a parabοla, which is a symmetric curve that οpens either upwards οr dοwnwards.
Given the table οf pοints fοr the cοntinuοus quadratic functiοn h(x), we can find the vertex and range οf the functiοn. Since the functiοn is quadratic and cοntinuοus, it can be represented in the standard fοrm [tex]$f(x)=a(x-h)^{2}+k,$[/tex], where (h, k) is the vertex οf the parabοla.
Tο find the vertex, we can use the fact that the x-cοοrdinate οf the vertex is given by -b/2a, where a and b are the cοefficients οf the quadratic term and the linear term, respectively. In this case, a = 1 (since the functiοn is cοntinuοus and quadratic), and b can be fοund using any twο pοints οn the parabοla:
[tex]\rm b=(h(x_2)-h(x_1))/(x_2-x1)=(4-7)/(-2+1)=3$[/tex]
Therefοre, the x-cοοrdinate οf the vertex is x = -b/2a = -3/2. Tο find the y-cοοrdinate οf the vertex, we can evaluate the functiοn at this value οf x:
[tex]$\rm h(-3/2)=(1)(-3/2-h)^{2}+k$[/tex]
Tο sοlve fοr k, we can use οne οf the pοints οn the parabοla, say (-6, 12):
[tex]$12=(1)(-6-h)^{2}+k\,$[/tex]
Expanding and simplifying, we get:
[tex]$12=(h-6)^{2}+k$[/tex]
Substituting -3/2 fοr h, we get:
[tex]$\begin{array}{l}{{12=(-(3/2)-6)^{2}+k}}\\\\ {{12=81/4+k}}\\\\ {{k=-21/4}}\end{array}$[/tex]
Therefοre, the vertex οf the parabοla is at the pοint (-3/2, -21/4).
Tο find the range οf the functiοn, we can lοοk at the shape οf the parabοla. Since the cοefficient οf the quadratic term is pοsitive, the parabοla οpens upwards, and the vertex is the lοwest pοint οn the graph. Therefοre, the range οf the functiοn is all real numbers greater than οr equal tο the y-cοοrdinate οf the vertex, which is -21/4. In interval nοtatiοn, we can write the range as (-21/4, infinity).
Hence, the vertex οf the parabοla is at the pοint (-3/2, -21/4) and the range οf the functiοn wοuld be (-21/4, infinity).
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In a study with randomly selected participants, it was found that "45.3 % of adults report that they live with one or more chronic conditions". The study also reported a margin of error 3.5 %. Create a 95% confidence interval for the proportion of all U.S. adults living with chronic conditions. don't round.
To create a 95% confidence interval for the proportion of all U.S. adults living with chronic conditions, we can use the following formula:
CI = p ± zsqrt(pq/n)
where:
p is the sample proportion (0.453)
q is the complement of p (1 - p = 0.547)
z is the z-score associated with a 95% confidence level (1.96)
n is the sample size (unknown)
We need to find the sample size (n) in order to calculate the confidence interval. We can do this by using the margin of error formula:
ME = zsqrt(pq/n)
where ME is the margin of error (0.035)
Solving for n, we get:
n = (z^2 * p * q) / ME^2 = (1.96^2 * 0.453 * 0.547) / 0.035^2 = 580.04
Rounding up to the nearest whole number, the sample size is 581.
Now we can substitute the values into the confidence interval formula:
CI = 0.453 ± 1.96sqrt(0.4530.547/581)
CI = 0.453 ± 0.035
The 95% confidence interval for the proportion of all U.S. adults living with chronic conditions is:
CI = (0.418, 0.488)
So we can say with 95% confidence that the true proportion of all U.S. adults living with chronic conditions is between 0.418 and 0.488.
what are two numbers whose product is 52 and whose sum is 11?
Answer:
There are no two numbers whose product is 52 and whose sum is 11.
Step-by-step explanation:
give the 1st number is x and the 2nd number is y, then
x + y = 11 and xy = 52
x + y = 11 => y = 11 - x
x(11 - x) = 52
11x - x^2 = 52
=> x^2 - 11x + 52 = 0
Using quadratic formula: ax^2 + bx + c = 0
with a = 1, b = -11, c = 52
=> x = [-b ± √(b^2 - 4ac)]/2a
=> x = [-(-11) ± √((-11)^2 - 4x1x52)]/2x1
=> x = [11 ± √(121 - 208)]/2
=> x = [11 ± √(-87)]/2
Since the square root of a negative number is not a real number, there are no real solutions to this equation. Therefore, there are no two numbers whose product is 52 and whose sum is 11.
A display case is shaped like the prism shown below. The bases are right triangles. Find the surface area of the prism.
Answer:
200ft²
Step-by-step explanation:
SA = 8(15) + (8+15+17) 20
= 120+ (4)(20)
= 120+80
= 200ft²
WILL GIVE TRUE 100 POINTS AND BRAINLYEST FOR THE CORRECT ANSWER
Answer:
B. S(15) - S(10) = -40 means that there were 40 less students in 2010 than there were in 2015. This statement is true because S(15) represents the number of students in the year 2015, and S(10) represents the number of students in the year 2010. Subtracting S(10) from S(15) gives the change in the number of students over that 5-year period.
C. S(0) = 2,000 means that there were no students in the year 2000. This statement is also true because S(t) represents the number of students in terms of the number of years after 2000. Therefore, S(0) represents the number of students in the year 2000, which is the starting point for the function.
Step-by-step explanation:
Your current CD matures in a few days. You would like to find an investment with a higher rate of return than the CD. Stocks historically have a rate of return between 10% and 12%, but you do not like the risk involved. You have been looking at bond listings in the newspaper. A friend wants you to look at the following corporate bonds as a possible investment. A 5-column table with 2 rows. Column 1 is labeled Bond with entries A B C 7 and one-half 15, X Y Z 7 and three-fourths 15. Column 2 is labeled current yield with entries 7.5, 8.4. Column 3 is labeled volume with entries 128, 17. Column 4 is labeled Close with entries 104 and three-fourths, 100 and one-half. Column 5 is labeled Net change with entries blank, + one-fourth. If you buy three of the ABC bonds with $10 commission for each, how much will it cost? a. $3142.50 b. $1047.50 c. $3172.50 d. $1077.50 Please select the best answer from the choices provided A B C D
If you were to buy one of each bond today, you would have to spend b. ABC $1104.75 and XYZ $1100.50.
Calculate Price of Bonds Based on Yield and Coupon Payment?The following algorithm must be used to determine a bond's price:
[tex]Bond\ price=(\frac{coupon\ payment}{(1+yield)^{time}} )+(\frac{coupon\ payment}{(1+yield)^{time+1}} )+...+(\frac{coupon\ payment+face\ value}{(1+yield)^{Time+n}} )[/tex]
Where:
dividend Payment: The bond's yearly dividend payment (in dollars)
Yield: The bond's yield to expiration (as a decimal)
Time: the interval between the issuance of each coupon and the receipt of its monetary value. (in years)
Face worth: The bond's face worth (in dollars)
The price of each bond can be determined as follows using the data in the table:
a. For bond ABC:
Coupon Payment = $7.50 (7.5% of $1000 face value)
Yield = 3.04% (convert 3.04 to a decimal)
Time = 0.5 years (since the bond's maturity date is July 15 and today marks the midway point between those dates)
Face Value = $1000
[tex]Bond\ price=(\frac{7.5}{(1+0.0304)^{0.5}} )+(\frac{7.5}{(1+0.0304)^{1.5}} )+(\frac{1000}{(1+0.0304)^{2}} )[/tex]
= 7.356 + 7.235 + 925.984
= $940.575
Since we are purchasing one bond and the face value is $1,000, we split this amount by 10 to get the price for one bond:
Price for one bond ABC = $940.575 / 10 = $94.058
b. For bond XYZ:
Coupon Payment = $84 (8.4% of $1000 face value)
Yield = 1.7% (convert 1.7 to a decimal)
Time = 0.5 years
Face Value = $1000
[tex]Bond\ Price = (84 / (1 + 0.017)^{0.5}) + (84 / (1 + 0.017)^{1.5}) + (1000 / (1 + 0.017)^2)[/tex]
= 83.379 + 81.838 + 968.661
= $1133.878
Since the face value of a bond is $1,000 and we are only purchasing one, we split this amount by 10 to get the price for one bond:
Price for one bond XYZ = $1133.878 / 10 = $113.388
Therefore, the correct answer is:b. ABC: $1104.75 XYZ: $1100.50
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A 25% orange juice drink is mixed with a 100% orange juice drink. The function f(x)=
concentration of orange juice in the drink after a gallons of the 25% drink are added to 4 gallons of pure juice.
(4)(1.0)+z(0.25) models the
4+2
What will be the concentration of orange juice in the drink if 2 gallons of 25% drink are added? Give the answer as a percent
but do not include the percent sign (%).
We need to mix 3.2 units of the 25% orange juice with 0.8 Units of the 100% orange juice to get a 4-unit mixture with a 25% concentration of pure orange juice.
The first thing we need to do is figure out how much of each type of orange juice we need to mix together to get the desired 25% concentration. Let's call the amount of the 25% orange juice "x" and the amount of the 100% orange juice "y".
We know that the total amount of juice we want to end up with is "4" (since the function f(x) is equal to 4 + 2). So we can write an equation based on that:
x + y = 4
We also know that we want the final concentration to be 25%, which means that the amount of pure orange juice in the mixture should be 25% of the total volume. To calculate that, we can use the formula:
0.25 = (0.25x + y) / 4
Simplifying that equation, we get:
0.25x + y = 1
Now we have two equations with two unknowns (x and y), which we can solve using substitution or elimination. I'll use substitution here:
x = 4 - y (from the first equation)
0.25(4 - y) + y = 1 (substituting for x in the second equation)
1 - 0.25y + y = 1
0.75y = 0
y = 0
Uh-oh, that's not good. It looks like we can't use any of the 100% orange juice, or we'll end up with a concentration greater than 25%. Let's double-check our equations and see if there's a mistake.
x + y = 4
0.25x + y = 1
Hmm, it looks like we made a mistake in the second equation. The 0.25x term should be multiplied by the concentration of the 25% orange juice, which is 0.25 (or 25% as a fraction). So the correct equation should be:
0.25(0.25x) + y = 1
Now let's solve for y:
0.0625x + y = 1
y = 1 - 0.0625x
Substituting that into the first equation, we get:
x + (1 - 0.0625x) = 4
0.9375x = 3
x = 3.2
So we need to mix 3.2 units of the 25% orange juice with 0.8 units of the 100% orange juice to get a 4-unit mixture with a 25% concentration of pure orange juice.
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Tara invests $555 into a savings account that has an interest rate of 12.6% and is compounded quarterly. How many years will it take for the account to reach a balance of $5,600?
a. 18.6 years
b. 10.7 years
c. 18.0 years
d. 17.3 years
Tara invests $555 into a savings account that has an interest rate of 12.6% and is compounded quarterly. It will take 18.6 years for the account to reach a balance of $5,600.
What do you mean by interest rate?The amount that the lender charges the client above and beyond the initial amount is referred to as the interest rate. Given the time worth of money, a person who deposits money in a bank or other financial organisation also gets extra revenue known as interest received by the depositor.
Using the quarter compound formula given below-
[tex]$ \rm A = P (1 + \frac{r}{4})^{4 \times t}[/tex]
Where,
Interest in a year (r)= 12.6% = 12.6/100= 0.126
Actual amount (P)= $555
Final amount (A)= $5,600
Lets solve:
[tex]5,600 = 555(1+0.126/4)^{4t[/tex]
Or, [tex](4.126/4)^{4t}= 5600/555[/tex]
Or, 4t ln(4.126/4)= ln 5600/555
Or, 4t =74.532
Or, t ≈ 18.6
Hence the correct answer is 18.6 years
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Please guys Help me ASAP!!!
The true statement about the value of a in comparison to 0 and 1 is that it is a real number between 0 and 1.
A graph of y = f⁻¹(x) is shown below.
An equation for f⁻¹(x) is [tex]y=\frac{1}{a^x}[/tex].
What is a decreasing function?For any given function, y = f(x), if the output value (range or y-value) is decreasing when the input value (domain or x-value) is increased, then, the function is generally referred to as a decreasing function.
By critically observing the graph of f(x), we can logically deduce that [tex]a^x[/tex] is positive for all values of x and as such, all values of a must also be positive:
0 < a
Additionally, the exponential function [tex]a^x[/tex] represent a decreasing function, so for any values of x, we have:
[tex]a^x > a^{x+1}[/tex]
1 > a
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The table gives the number of cellular telephone subscribers in a country (in thousands) from 2007 through 2012. Find the average annual rate of change during this time period.
The average annual rate of change during the time period 2007-2012 is
I Need help ASAP!!!!!!
Rounding to the nearest unit, the average annual rate of change during this time period is 10,797.
What is equation?An equation is a mathematical statement that shows that two expressions are equal. It typically contains variables, coefficients, and mathematical operations such as addition, subtraction, multiplication, and division. An equation can be solved to find the value of the variable that makes the statement true. Equations are used in many areas of mathematics and science, as well as in everyday life, to model relationships and solve problems.
Here,
To find the average annual rate of change, we need to calculate the total change in subscribers over the 6-year period and divide by the number of years. The total change is the final value minus the initial value, or:
335,244 - 270,461 = 64,783
The number of years is 6.
So the average annual rate of change is:
64,783/6 = 10,797.17
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What is the inverse probability of drawing either an 8 or a 9 from a deck of cards?
The inverse probability of drawing either an 8 or a 9 from a deck of cards is 0.852.
What is probability?
The likelihood of an occurrence can be determined using probability. It can only be applied to determine how likely an event is to occur. a scale with 0 being impossible and 1 being a specific occurrence.
We know that there are 52 cards in a deck consisting of 4 cards of each number.
So,
⇒ Probability of drawing 8 = [tex]\frac{4}{52}[/tex]
⇒ Probability of drawing 8 = [tex]\frac{1}{13}[/tex]
Similarly,
⇒ Probability of drawing 9 = [tex]\frac{4}{52}[/tex]
⇒ Probability of drawing 9 = [tex]\frac{1}{13}[/tex]
Now,
Let event A be drawing a 8 and event B drawing a 9.
So,
⇒ P (A ∪ B) = [tex]\frac{1}{13}[/tex] + [tex]\frac{1}{13}[/tex] - ([tex]\frac{1}{13}[/tex] * [tex]\frac{1}{13}[/tex] )
⇒ P (A ∪ B) = [tex]\frac{2}{13}[/tex] - [tex]\frac{1}{169}[/tex]
⇒ P (A ∪ B) = [tex]\frac{25}{169}[/tex]
⇒ P (A ∪ B) = 0.148
Inverse probability = 1 - 0.148
Inverse probability = 0.852
Hence, the inverse probability of drawing either an 8 or a 9 from a deck of cards is 0.852.
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3(2 +6j what’s the answer
Answer: 6 + 18j
Step-by-step explanation: you distribute the 3
Four part spinner is spun twice total number of possible outcomes
ohn spent 20% of his money on food. He spent 2/5 of the remainder on a toy. The toy cost $12.
(a) What percentage of his money did he spend on the toy?
(b) How much money did he have at first?
Toy Cost Percentage
Aditya Kashyap
ohn spent 20% of his money on food. He spent 2/5 of the remainder on a toy. The toy cost $12.
(a) What percentage of his money did he spend on the toy?
b) How much money did he have at first?
(a) To find the percentage of his money that John spent on the toy, we need to first find the total amount of money he had left after spending 20% on food.
Let's say John had x amount of money initially.
Then, he spent 20% of x on food, which is 0.2x.
So, he had (x - 0.2x) = 0.8x amount of money left.
Next, he spent 2/5 of this remaining amount on a toy, which cost $12.
Therefore, 2/5 of 0.8x = $12
Simplifying this, we get:
0.32x = $12
x = $37.50
So, John had $37.50 initially.
Now, to find the percentage of his money that he spent on the toy, we can use the formula:
Percentage = (Amount spent on toy / Total initial amount) x 100
Amount spent on toy = $12
Total initial amount = $37.50
Plugging these values into the formula, we get:
Percentage = (12 / 37.50) x 100
Percentage = 32%
Therefore, John spent 32% of his money on the toy.
(b) John had $37.50 at first.
try to evaluate the logarithm
(a) log5^25
can yall help me i dont get it
According to the given information, the equation that represents the proportional relationship is y = (1/4)x
What is proportion?
Proportion is a mathematical concept that describes the equality of two ratios. In other words, it is a statement that two ratios or fractions are equal.
For example, if we have two fractions, a/b, and c/d, we can say that they are in proportion if:
a/b = c/d
We can see that the ratio between X and Y is always 4:1, which means that Y is one-fourth of X. We can write this as:
Y = (1/4)X
Therefore, the equation that represents the proportional relationship is:
y = (1/4)x
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5.
What is the width of a rectangle if the area is 2x²-x-6 and the length is 2x + 3?
O-x-1--
x-2
3
2x+3
O-x+ 2
MacBook Air
2x²-1
2
Onone of the answer choices
Answer: x-2
Use A=Lw
A/L=w
if you factor and cancel, you are left wirh x-2.
help answer math question please
Answer:f(2)=27
g(-4)=3
h(3)=28/9
Step-by-step explanation:
f(x)=-3I x- 11 I, when f(2)
f(2)= -3 I 2-11 I
f(2)= -3 I -9 I
f(2)= -3*-9
f(2)=27
g(x)=1 + the square root of x+8, when g(-4)
g(-4)=1+the square root of -4+8
g(-4)=1 + the sqaure root of 4( 2= the sqaure root of 4 )
g(-4)=1+ 2
g(-4)=3
h(x)=3x^2 +1/ x^2, when h(3)
h(3)=3(3)^2 +1/ 3^2
h(3)=3(9)+1/9
h(3)=28/9
HOPE IT HELPS :)
“Number line” 1⁄2, 3⁄4, 60%, .56, 85%. Place the largest and smallest product between 2 of the values on the number line. Place the largest and smallest quotient between 2 of the values on the number line.
The numbers "1⁄2, 3⁄4, 60%, .56, 85% " are represented on number line such as given below in figure.
A number line is a pictorial representation of numbers on a straight line. It’s a reference for comparing and ordering numbers. It can be used to represent any real number that includes every whole number and natural number. Just to recollect, the whole number is a set of numbers that include all counting numbers (1, 2, 3,4,5,6 …….) and zero (0), whereas the natural number is the set of all counting numbers i.e. 1, 2, 3, 4, 5, 6……..
Writing numbers on a number line make it easier to compare the numbers. From the above figure, we can see that the integers on the left side are smaller than the integers on the right side. For example, 0 is less than 1, -1 is less than 0, -2 is less than -1, and so on.
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whats is 100x+10=11 if x isn't a fraction???
I need help because i have work due tomorrow,
i would appreciate if you could help me, please and thank you.
What is a thirty degrees angle
Answer:
A 30 degree angle is an acute angle cause its less than 90 degrees
Answer:
A thirty degree angle is an acute angle.
A thirty degree angle is formed when two lines meet or intercept at a point .
A thirty degree angle is one in which the measure is less than 90 degrees
i want to confirm this logarithm with my answer ,
3 log 4
Answer:
Of course! The value of 3 log 4 is approximately 4.7712. Does that match your answer?