Based on the miles that each car can travel on, the unit rate of miles per gallon for each car is:
Blue car - 30.8 miles per gallonRed car - 5.5 miles per gallonThe car that can therefore travel the greater distance on 1 gallon of gasoline is the Blue car.
What is the unit rate for the miles per gallon?The blue car can travel 38.5 miles on 1.25 gallons of gasoline. The unit rate is:
= 38.5 / 1.25
= 30.8 miles per gallon
The red car can travel 22/5 miles on 0.80 gallons of gasoline so the unit rate is:
= 22/5 ÷ 0.80
= 5.5 miles per gallon
The blue car can therefore travel the greater distance on 1 gallon of gasoline.
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Gabrielle buys a plant that is 3 inches tall. It grows at a rate of 3 1 inches per month. The graph below represents the relationship between the number of months and the height of the plant.
The expression that represents the relationship between the number of months and the height of the plant will be 3 + 3.1m
How to illustrate the information?It should be noted that from the information, Gabrielle buys a plant that is 3 inches tall and the plant grows at a rate of 3.1 inches per month.
Therefore, the expression to show the relationship will be:
= 3 + (3.1 × m)
= 3 + 3.1m
Therefore, the expression that represents the relationship between the number of months and the height of the plant will be 3 + 3.1m.
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100 points
f(x+h) - f(x) = -3hx² + 7hx + 4h²x - 5h² - 3h³
find f'(x)
The required differentiation of f(x) is f'(x) = 6hx -7h -4h² - f'(x + h)
Given that,
To determine the differentiation f'(x)
f(x+h) - f(x) = -3hx² + 7hx + 4h²x - 5h² - 3h³ is given,
Differentiation is defined as the instantaneous rate of change of a particular quantity with respect to another.
Here,
f(x + h) - f(x) = -3hx² + 7hx + 4h²x - 5h² - 3h³
differentiate with respect to x
d[f(x + h)]/dx - df(x)/ dx = -3hdx² /dx + 7hdx /dx + 4h²dx/dx - d(5h² + 3h³)/dx
f'(x + h) - f'(x) = -6hx + 7h + 4h²
f'(x) = 6hx -7h -4h² - f'(x + h)
Thus, required differentiation of f(x) is f'(x) = 6hx -7h -4h² - f'(x + h).
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rewrite each expression by factoring out the coefficient of variable -2x+3
By factoring out the coefficient of variable, -2x+3 can be written as [tex]-2(x-\frac{3}{2})[/tex].
Factoring out means isolating a common factor from an expression. A number or a variable that is multiplied by another variable in the expression forms the coefficient. The factoring out of the coefficient of variable means taking the factor of the coefficient part of the variable term.
Given data is an expression -2x+3.
-2 is the coefficient of variable x. So, factoring out the (-2) from -2x+3:
It can be written as [tex]-2(x-\frac{3}{2} )[/tex]
Hence, -2x+3 can be written [tex]-2(x-\frac{3}{2})[/tex] by factoring out the coefficient of variable.
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A bag with 8 marbles is shown below. 2 marbles are red and 6 are blue.
The probability that it is blue or red is 1
How to determine the probability?The given parameters are
Marbles = 8
Red = 2
Blue = 6
The probability that the selected marble is blue or red is calculated as
P = P(Blue) + P(Red)
This gives
P = 6/8 + 2/8
Evaluate the sum
P = 1
Hence, the probability that it is blue or red is 1
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Complete question
A bag with 8 marbles is shown below. 2 marbles are red, and 6 are blue. A marble is chosen from the bag at random. What is the probability that it is blue or red?
Write your answer as a fraction or a whole number.
If Point B is is the midpoint of line AC how do I dove the correct way to find B?
The coordinates of point B, (x, y) is given by (x, y) = ((a₁ + c₁)/2, (a₂ + c₂)/2)
Midpoint of a lineFrom the question, we are to determine how to find the coordinates of B
From the given information,
Point B is the midpoint of line AC
If the coordinates of point A are (a₁, a₂) and the coordinates of point C are (c₁, c₂)
Then,
The coordinates of the midpoint (x, y) is given by
(x, y) = ((a₁ + c₁)/2, (a₂ + c₂)/2)
Hence, the coordinates of point B, (x, y) is (x, y) = ((a₁ + c₁)/2, (a₂ + c₂)/2)
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Cedric lives in an apartment and pays the following expenses each month: electric bill,
$33.90; TV streaming service, $24.99; and rent, $538.95. Estimate his total expenses for
the month by first rounding each value to the nearest tens place.
A. $550
B. $590
C. $598
D. $600
Answer:
C. $598
Step-by-step explanation:
$33.90 = $34
$24.99 = $25
$539.95 = $539
Write the equation of the line that passes through the points (1,−9) and (3,−17).
Answer:
Step-by-step explanation:
Point slope form y-y₁ = m(x-x₁)
-9 - (-17) = m(1 - 3)
8 = m(-2)
-4 = m
y= -4x + b
-9 = -4(1) + b
b = -5
y = -4x - 5
Length of gestation < 20 weeks 20 − 27 weeks 28 − 36 weeks > 36 weeks Probability .0004 .0059 .0855 .9082 Furthermore, the conditional probability of low birth weight, given that length of gestation is < 20 weeks is .540 while this probability is .813, given that length of gestation is 20−27 weeks, is .379 when given that length of gestation is 28 − 36 weeks, and this probability is .035, given that length of gestation is > 36 weeks. (a) What is the probability that an infant has a low birth weight? (b) Show that the events {length of gestation ≤ 27 weeks} and {low birth weight} are not independent. (c) What is the probability of having a length of gestation ≤ 36 weeks given that a child is low birth weight?
(a) The probability of an infant has a low birth weight is equal to 1540.
(b) Won't find a probability that the event is not less than 27 and are not independent. So we need to answer that we will have to find a low both by given less than equal to the 27 point.
(c) Probability in less than equal to 36 and 8, given problem the 1 now for the probability the we have found already equal to 0692 point and for the time it will be the sum of the 3 of them.
The length of the gestation 123 under 4, and the first 1 will be small and then the came 3 weeks, and this 1 will be from the 22. The 27 weeks- and this will be the 28 to the 36 weeks- this will be the greater than the 36 weeks and we have the probability for each of them, for the first 1 will be. The 1 will be 59 point. This 1 will be the 855, and this 1 will be the ebon 9 to 82 and the next 1. We will have the call this. The means that the will be the frame is not the lowest weight, so condition will be low, and this 1 will be no more, which makes it easier now and no more no more. It will be, and this will be no more.
It will again now and then no more so from the question here even to win be less than 20, with the probability low weight equal to 1540, the common among 1 minus that equal to 46 point the next 1 for the 2227 point, the probability equal to the 1, is 13, the common 1 equals to 1 minus 0 upon , 131 minus upon 13 ease and the next 1 will on 3791 minus 379 to 621, and the last 1 will be the 1351 minus 35 o 965, and that will be the summary of The question here the question: find the probability that an infant has a child, so we have the lobed and we want to root the. By going to the first plan, and this 1 . I got you this 1 and then got you. got the last 1 and then got to the low, so we multiply them like a pair and then we add them up. So if we do it, we should get the tiptoe. We keep going like this until the last value will be on 982 time 35, and if we compute it, we will have the 4 times 4 plus 59 times upon a 13 plus 3855 times 379 plus upon 9082 times 35 equal to 0692 point for the question B, won't you find a probability that the event is not less than 27 and are not independent. So we need to answer that we will have to find a low both by given less than equal to the 27 point, so it will be between the both of them here. So we will end up the first and second 1, so we will have. It will be equal to. I will try to find the probability, the al and the less than equal to 27 point. So we'll add up this 1 and this 1 together. So we get on 5 , 59 and 10 times 13, and if we compare the 54 plus 5910 on a 135127 point and then we want to find a probability of the time with the probability point probably the end. We have equal to the 1692 we found in the time when the problem is the last time question to 27 will be the sum of the all be the 59, and we can equal to the 59 times 4 equal to the 2152 times 10 to the power. Minus 6 and it's a different form, the 127 point, so the form they are not independent and for of question c 1251 is the probability of the testation will be less than equal to the thirty. Sixth, given that this 1 by the formula equal probability in less than equal to 36 and 8, given problem the 1 now for the probability the we have found already equal to 0692 point and for the time it will be the sum of the 3 of them here on together, so it will be easy adjacent to her .0692 l minus the last 1 here will be minus 982 times 35 and if we compute it, we go have on in 82 times 35006. So let me compute again. 0.9082100. .035 point. the son from here, so let me compare again time, 5 or so 59 times upon it: 13 plus 55 times 3 on 982 times upon 35, then this 1 equal to the point 6 p. This will be correct here, 692 point. So this 1 minus 82 times 5692 point and if we compute we can equal to the 0.54071.
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HELP WITH ALLLLL PLEASE THIS IS ALGEBRA II BTWWW:))
Answer:
[tex]\textsf{23.} \quad c)\;\;y=-2x+7[/tex]
[tex]\textsf{24.} \quad 12[/tex]
[tex]\textsf{25.} \quad -2.33\:\:\sf (2\:d.p.)[/tex]
Step-by-step explanation:
Question 23Given equation:
[tex]y=\dfrac{1}{2}x-1[/tex]
If two lines are perpendicular to each other, the slopes are negative reciprocals.
Therefore, the slope of a line perpendicular to the given equation is -2.
Substitute the found slope and the given point (3, 1) into the point-slope formula to find the equation of the line:
[tex]\implies y-y_1=m(x-x_1)[/tex]
[tex]\implies y-1=-2(x-3)[/tex]
[tex]\implies y-1=-2x+6[/tex]
[tex]\implies y=-2x+7[/tex]
Question 24Define the variables:
Let x = number of $20 bills.Let y = number of $50 bills.Given information:
Total amount cashed = $390Total number of bills = 15Create two equations with the given information:
[tex]\begin{cases}x+y=15\\20x+50y=390\end{cases}[/tex]
Solve the first equation for y:
[tex]\implies y=15-x[/tex]
Substitute the found expression for y into the second equation and solve for x:
[tex]\implies 20x+50(15-x)=390[/tex]
[tex]\implies 20x+750-50x=390[/tex]
[tex]\implies -30x+750=390[/tex]
[tex]\implies -30x=-360[/tex]
[tex]\implies x=12[/tex]
Therefore, Kerry received 12 twenty-dollar bills.
Question 25Given expression:
[tex]\dfrac{6^2-4^2}{-10+\sqrt{2}}[/tex]
Following the order of operations (PEMDAS), simplify the numerator:
[tex]\implies \dfrac{36-16}{-10+\sqrt{2}}[/tex]
[tex]\implies \dfrac{20}{-10+\sqrt{2}}[/tex]
Calculate the square root:
[tex]\implies \dfrac{20}{-10+1.414213...}[/tex]
Simplify the denominator:
[tex]\implies \dfrac{20}{-8.5857864...}[/tex]
Divide the numerator by the denominator:
[tex]\implies -2.3294313...[/tex]
Therefore:
[tex]\implies \dfrac{6^2-4^2}{-10+\sqrt{2}}=-2.33\:\: \sf (2\:d.p.)[/tex]
Which expression is equivalent to sum of quantity negative three and one third times n plus one sixth end quantity plus quantity one and three sixths times n minus three twelfths end quantity?
A: negative twenty nine sixths times n minus one twelfth
B: negative twenty nine sixths times n plus one twelfth
C: negative eleven sixths times n minus one twelfth
D: negative eleven sixths times n plus five twelfths
The equivalent expression is negative eleven sixths times n minus one twelfth. Option C
What are algebraic expressions?Algebraic expressions are expressions that are made up of terms, variables, factors, coefficients, constants.
They are also made up of mathematical operations.
Equivalent expressions are defined as expressions have the exact same solution but may have different arrangement of values.
Given the expression;
[ -3 1/ 3n + 1/ 6 } + { 1 3/ 6n - 3/ 12 }
simply the expression;
- 10/ 3n + 1/ 6 + 9/6n - 3/ 12
collect like terms
-10/ 3n + 9/ 6n + 1/ 6 - 3/ 12
-20n + 9n/6 + 2 - 3 /12
Add like terms
-11n/ 6 - 1/ 12
Thus, the equivalent expression is negative eleven sixths times n minus one twelfth. Option C
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Bao goes out to lunch. The bill, before tax and tip, was $15.80. A sales tax of 4.5% was
added on. Bao tipped 15% on the amount after the sales tax was added. How much tip
did she leave? Round to the nearest cent.
Answer:
$18.59
Step-by-step explanation:
Tax:
15.80 x .045 = .711
Cost after tax:
15.80 +.711 = 16.511
Tip:
16.511 x .15 = 2.47665
Total cost
16.511 + 2.47665 = 18.58665 Rounded to the nearest penny is $18.59
In (triangle) ABC, AB is extended to D. If m/ACB = 8x, m/CAB = 5x+10, and, m/CBD=7x+34, what is the value of x?
Step-by-step explanation:
the sum of fmeasure angle of triangle is 180°
so <A + < B + <C = 180
6x - 24 = 0
x = 4
Slove this question!!!!!!!!!!!!!!
Answer:
247/8
Step-by-step explanation:
Write a piecewise definition for the function and sketch its graph.
The piecewise definition for the function is
f(x) = 3x^3, x < 0f(x) = -3x^3; x >= 0How to write a piecewise definition for the function and sketch its graph?The definition of the function is given as:
f(x) = |3x^3|
Remove the absolute bracket in the above function
So, we have:
f(x) = 3x^3 and f(x) = -3x^3
The domain of the above functions are
x < 0 and x >=0
Next, we plot the graph of the function
See attachment for the graph of the piecewise definition for the function
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Evaluate 5x, for x=9
Answer: 45
Step-by-step explanation:
1. Replace x with 9 in term. Replacing x with 9 turns the term 5x into 5(9).
2. Multiply. 5 times 9 = 45.
This means that if x is equal to nine, then 5x is equal to 45/
Y=-1/2x+2 Find the x intercept of each line define below and compare they values
The x intercept of the defined line is x = -4
How to find the x intercept of the defined line?The equation of the line is given as
y = 1/2x + 2
At the x intercept of the defined line, the value of y is 0
i.e. y = 0
So, we have
1/2x + 2 = 0
Subtract 2 from both sides of the equation
So, we have
1/2x = -2
Multiply through the equation by 2
So, we have
x = -4
Hence. the x intercept of the defined line is x = -4
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What is the minium value of the function g (x) = x^2 - 6x - 12?
The minimum value of the function is = -12
The function g(x) is defined for integers x such that if x is even, g(x) = x/2 and if x is odd, g(x) = x + 5.
given that , g(x)= x^2 - 6x - 12
asked to find minimum value
to get minimum value of g(x) put x=0
on putting x=0 ,the value of x^2 becomes 0
the value of 6x also becomes 0
so the equation g(0) becomes 0-0-12
g(0)= -12
on putting x=0 we get g(0) as -12 which is its minimum value
we get minimum value for g(x) when x=0
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Answer:
The function's minimum value is -12.
Step-by-step explanation:
Integers x are used to define the function g(x), and it is defined so that if x is even, g(x) = x/2 and if x is odd, g(x) = x + 5.
Considering, g(x)=x2 - 6x - 12
requested to determine the minimal value
Put x=0 to obtain the minimal value of g(x).
When x=0 is entered, the value of x2 is changed to 0.
6x's value is also reduced to 0.
so the equation g(0) becomes 0-0-12
g(0)= -12
on putting x=0 we get g(0) as -12 which is its minimum value
we get minimum value for g(x) when x=0
A particle moves along a number line according
to the following instructions.
Start at position 5
Move left 4 units
Move right 8 units
Move right 6 units
Move left 13 units
How far is the particle from the initial starting point?
A. 2
B. 3
C. 8
D. 26
E. 36
-
-
-
-
-
at the end the particle is at 3 units from the starting point.
How far is the particle from the initial starting point?
Here we have one-dimensional motion, so the position of the particle is given by scalars.
We know that the particle starts at position 5. If it moves to the left, we subtract the value, if it moves to the right, we add the value.
Here we have the sequence of motions:
Move left 4 unitsMove right 8 unitsMove right 6 unitsMove left 13 unitsThen the final position will be at:
5 - 4 + 8 + 6 - 13 = 2
Then the final position is at 2, and the initial position is at 5, the difference between these is: 5 - 2 = 3
Then, at the end the particle is at 3 units from the starting point.
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i need help figuring this out.
Answer:
b
Step-by-step explanation:
Simplify -100 square rooted
Answer:
√-100 = 10 i
Step-by-step explanation:
√-100 = √100 × √-1
The square root of 100 is 10. Furthermore, the square root of negative 1 is an imaginary insignificant number (iota) which can be transliterated as i. That's it. Now, we have our answer to the square root of negative 100.
Need some help with this
500 g of a radioactive element is decaying exponentially. After 8 days 358 g of the element is left.
a. Write a function in the form y = yo ekt giving the number of grams of the element after t days.
358 f(t)
b. Write the function from part a in the form y=Yo
500
c. Use the answer from part a to find the half-life of the element.
a. The exponential equation in the form y=yoekt is
(Round to three decimal places as needed.)
From the situation described, we have that:
a) The exponential function is: [tex]y(t) = 500e^{-0.041759389t}[/tex]
b) The rule is: [tex]y(t) = y(0)\left(\frac{358}{500}\right)^{\frac{t}{8}}[/tex]
c) The half-life of the element is of 16.599 days.
What is the exponential function?The exponential function for the substance's amount after t days is given by:
[tex]y(t) = y(0)e^{-kt}[/tex]
For this problem, we have that:
y(0) = 500, y(8) = 358.
Hence we can solve for k as follows:
[tex]y(t) = y(0)e^{-kt}[/tex]
[tex]358 = 500e^{-8k}[/tex]
[tex]e^{-8k} = \frac{358}{500}[/tex]
[tex]\ln{e^{-8k}} = \ln{0.716}[/tex]
-8k = ln(0.716)
k = -ln(0.716)/8
k = 0.041759389.
Hence:
[tex]y(t) = 500e^{-0.041759389t}[/tex]
For item b, 358/500 of the substance is the amount remaining each period of 8 days, hence f(t) = t/8 and the rule is given by:
[tex]y(t) = y(0)\left(\frac{358}{500}\right)^{\frac{t}{8}}[/tex]
For item c, using the rule from item a, we have to find t for which y(t) = 0.5y(0), hence:
[tex]y(t) = y(0)e^{-0.041759389t}[/tex]
[tex]0.5y(0) = y(0)e^{-0.041759389t}[/tex]
[tex]e^{-0.041759389t} = 0.5[/tex]
[tex]\ln{e^{-0.041759389t}} = \ln{0.5}[/tex]
-0.041759389t = ln(0.5)
t = -ln(0.5)/0.041759389
t = 16.599.
The half-life of the element is of 16.599 days.
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[tex]-8(x-4)-3\leq 5[/tex]
At SpaceX, level 1 engineers make a salary of $56,000 a year and level 2 engineers get a yearly salary of $68,000. They have 8 total engineers, all which are level 1. They are looking to promote some of them to level 2. However, next year they’ll only be able to afford $472,000 in engineer salaries.
Write a system of equations befitting this problem where a is the number of level 1 engineers and b is the number of level 2 engineers.
Number of level 1 engineers is 6 and number of level 2 engineers is 2.
Let a is the number of level 1 engineers working at SpaceX and b is the number of level 2 engineers working at SpaceX.
So, Total Numbers of Engineers at SpaceX is 8.
[tex]a+b=8\\[/tex]
Yearly Salary of a Level 1 Engineer that will get is $56,000. and yearly salary of a Level 2 Engineer that will get is $68,000.
And the amount of salary next year company will only be able to afford $472,000.
So,
[tex]56000a + 68000b = 472000[/tex]
Solving both the equation
[tex]a+ b = 8\\56000a + 68000b = 472000[/tex]
on multiplying first equation -56000 and adding it
[tex]-56000x - 56000y = -448000\\56000x + 68000y = 472000[/tex]
[tex]12000b = 24000\\b = 2\\[/tex]
So, a = 6.
So, Number of level 1 engineers is 6 and number of level 2 engineers is 2.
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Number of level 1 engineers is 6 and number of level 2 engineers is 2.
Let a is the number of level 1 engineers working at SpaceX and b is the number of level 2 engineers working at SpaceX.
SinceTotal Numbers of Engineers at SpaceX is 8.
[tex]a+b=8[/tex]
Yearly Salary of a Level 1 Engineer that will get is $56,000. and yearly salary of a Level 2 Engineer that will get is $68,000.
And the amount of salary next year company will only be able to afford $472,000.
So,
[tex]56000a+68000b=472000[/tex]
Solving both the equation
on multiplying first equation -56000 and adding it
[tex]-56000a-56000b=-448000\\56000a+68000b=472000[/tex]
[tex]12000b = 24000\\b = 2000[/tex]
So, a = 6.
So, Number of level 1 engineers is 6 and number of level 2 engineers is 2.
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How would you write 125/6^−4using a positive exponent?
Answer: 162000
Step-by-step explanation:
Reduce the expression, if possible, by cancelling the common factors.
162000
[tex]\displaystyle\\Answer:\ (\frac{6}{125})^4[/tex]
Step-by-step explanation:
[tex]\displaystyle\\(\frac{125}{6} )^{-4}=\\\\(\frac{6}{125})^{-(-4)}= \\\\(\frac{6}{125})^4[/tex]
21/09/22
un articulo regulamente cuesta $85 pesos esta a
la venta con un descuento del 30% del precio regular
¿Cual es el precio de venta?
Given the function 7x+2y=6, rearrange the equation so that x is the independent variable.
Two expressions with an equal sign is equation, The given function is 7x+2y=6, The equation when x is independent variable is x=(6-2y)/7.
What is equation?Two expressions with an equal sign in between is called as equation.
The given equation is 7x+2y=6.
In the given equation x and y are two variables.
According to the question, to make x as independent variable we have to perform few operation in equation.
7x+2y=6.
Subtract 2y on both sides
7x+2y-2y=6-2y
7x=6-2y
Divide both sides by 7
x=(6-2y)/7.
Therefore the independent variable x is (6-2y)/7.
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Simplify (4.3 × 10−2)(5.12 × 10−10). Write the final answer in scientific notation.
2.2016 × 10^−11
2.2016 × 10^20
22.016 × 10^−12
2.2016 × 10^20
The scientific notation of (4.3 × 10⁻²)(5.12 × 10⁻¹⁰) on simplifying is 2.2016 × 10⁻¹¹ which is option (A).
Scientific notation could be a thanks to write terribly massive and really little numbers. There square measure 2 elements to scientific notation, a constant between one however but ten and also the power of 10. The constant features a whole half (left of the decimal point) and also the decimal half (right of the decimal point) referred to as the fixed-point part.It is given that (4.3 × 10⁻²)(5.12 × 10⁻¹⁰) .
On multiplying 4.3 by 5.12 , we get
4.3 × 5.12 = 22.016
Using exponent law for 10⁻² and 10⁻¹⁰ , we get
10⁻² × 10⁻¹⁰ = 10⁻²⁻¹⁰
= 10⁻¹²
Hence as a whole it is written as 22.016 × 10⁻¹².
In scientific notation , it is written as 2.2016 × 10⁻¹¹ .
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find the width and height of an newer 90 inch televison whose aspect ratio is 16:9
The width and height of a newer 90 inch televison whose aspect ratio is 16:9 are 57.6 and 32.4 inches
How to find the width and height of an newer 90 inch televison whose aspect ratio is 16:9?The given parameters are
Aspect ratio = 16 : 9
Size = 90 inches
The width is calculated as
Width = 16/(16 + 9) * 90
Evaluate
Width = 57.6
This means that
height = 9/(16 + 9) * 90
Evaluate
height = 32.4
Hence, the width and height of a newer 90 inch televison whose aspect ratio is 16:9 are 57.6 and 32.4 inches
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Let a and b be real numbers where a + b 0. Which of the following functions could represent the graph below?
q
Of(x) = x(x-a)2(x-b)4
O f(x) = x(x-a)³(x-b)²
Of(x)=(x-a)(x- b)²
Of(x)= x²(x-a)5(x-b)
X
d Fuit
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