The quotient of two numbers is 20. Their sum is 84. What are the two numbers?

Answers

Answer 1

Answer: The two numbers are 80 and 4.
The quotient of 80 and 4 is 20: 80 ÷ 4 = 20
The sum of 80 and 4 is 84: 80 + 4 = 84

Related Questions

Hailey simplified the expression (12xy74x4y3)2 using the following steps:Step 1: (3x−3y4)2Step 2: 3x−6y8Step 3:3y8x6Did Hailey correctly simplify the expression?A Yes, Hailey correctly simplified the expression.B No, in Step 1, Hailey should have added the exponents instead of subtracting them.C No, in Step 2, Hailey should have squared each exponent value instead of multiplying each value by 2.D No, in Step 2, Hailey should have also multiplied the exponent of the coefficient by 2 to get 32.
Expand the following 4/5 (20x - 10)
Given equations A and B as 2/5x+y=12 and 5/2y-x=6 , respectively, which expression will eliminate the variable x?
URGENT PLEASE HELP WILL MARK U AS BRAINLIEST!!!!!
What is the result of isolating y2 in the equation below?(x + 4)2 + y2 = 22A.y2 = x2 - 8x + 6B.y2 = 22 - x2C.y2 = -x2 - 8x + 16D.y2 = -x2 - 8x + 6ALL y2 are y^2

Don't understand these problems

Answers

A = ¹/₂bh
A = ¹/₂(4z² - 10)(8z)
A = ¹/₂[4z²(8z) - 10(8z)]
A = ¹/₂(32z³ - 80z)
A = ¹/₂(32z³) - ¹/₂(80z)
A = 16z³ - 40z

What is negative 6 =

Answers

Answer:

-6

Step-by-step explanation:

If the number 36,000,000 is written in scientific notation, the numerical value of the exponent is

Answers

3.6 × $10^(7)$

The numerical value of the exponent is 7

Which of the following statement best describes the effect of replacing the graph of f(x) with the graph of f(x) - 3?A) the graph shifts 3 units up.
B) The graph shifts 3 units down. i think is correct?
C) the graph shifts 3 units left.
D)the graph shifts 3 units right.

Answers

The statement that best describes the effect of replacing the graph of f(x) with the graph of f(x) - 3 is; B) The graph shifts 3 units down.

what is graph?

A graph contains data of which input maps to which output.

Analysis of this leads to the relations which were used to make it. If we know that the function crosses x axis at some, then for some polynomial functions, we have those as roots of the polynomial.

The parent function is function of x and we the translated function is in the form f(x)-3.

Transformation Rule state that if the parent function is f(x) and if we subtract some constant 'a' in f(x) then the function will move down by 'a' units.

Thus, from the transformation rule, we can conclude that f(x) graph will shift down by 3 units.

Therefore, the correct option is; B) The graph shifts 3 units down.

Learn more about finding the graphed function here:

brainly.com/question/27330212

#SPJ6

to move a graph up c units, add c to the whole function

so basicaly what you did is you subtraced 3 from the whole function

the whole graph shifts 3 units down

B is answer

What mathematics concepts or principles did you apply to come up with the solution of each equation? explain how you applied these.please help me .....

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You need to look at the question again, and notice the words "... did you ...".
From those words, it's clear that the question comes AFTER you have solved
several equations, and now, this question is asking you how you solved them.

The only way for YOU to answer this question is to solve the equations first.

And if you want someone ELSE to tell the math concepts and principles that
are used to solve them, then you have to show him what the equations are.

Using the transformation T: (x, y) (x + 2, y + 1), find the distance named. Find the distance BB'

Answers

Answer:

$√(5)\ units$

Step-by-step explanation:

we know that

The rule of the translation is equal to

$(x,y)-----> (x+2,y+1)$

That means

The translations is $2$ units to the right and $1$ unit up

Let

$(x,y)$ -------> the coordinates of point B

$(x+2,y+1)$ ------> the coordinates of point B'

Find the distance

the formula to calculate the distance between two points is equal to

$d=\sqrt{(y2-y1)^(2)+(x2-x1)^(2)}$

substitute

$d=\sqrt{((y+1)-y)^(2)+((x+2)-x)^(2)}$

$d=\sqrt{(1)^(2)+(2)^(2)}$

$d=√(5)\ units$

The transformation is:
T : ( x , y ) → ( x + 2, y + 1 )
B ( 1, 3 ) → B` ( 1 + 2, 3 + 1 )
B ` ( 3, 4 )
d ( B B`) = √(( 3 - 1 )² + ( 4 - 3 )² )=
= √ (2² + 1²) = √ 5

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