What is the product of a subtraction equation called?

Answers

Answer 1

Answer:

Answer:

The "difference".

Step-by-step explanation:

In the equation 7-5=2, 2 is the "difference" between those numbers. Be careful when calling it a product though, because a product is the result of a multiplication equation!

*Bonus nonsense: The first number (7 here) is called the minuend, the second number (5 here) is called the subtrahend, and yes, I totally looked that bit up.

Answer 2

Answer: It is called “the difference”

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Solve for h if d=1/2hw
A(n) ________ is a shorthand notation for repeated multiplication of the same factor.
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What is the slope of these ordered pairs (3,-4(6,1)

Answers

Answer:

The slope would be 5/3

Step-by-step explanation:

Let me know if u have to simplify it

the length of a rectangle is 3 more than the width. if the area is 40 square inches, what is an equation to find the area and what is the length of the rectangle

Answers

Answer:

5 x 8 = 40 square cm

Step-by-step explanation:

the area of the field is 6000 square yards. write and solve a formula to find the width of the field

Answers

Answer: For a rectangular shape, the area is equal to the product of th length and the width. so A = L*W

If the area is 6000 $yd^(2)$

so if you want to know the width you need to solve the equation W = A/L for finding the value of W.

I think in the picture says that L = 60 yds

so W = 6000/60 = 100 yards.

L-lenght
W-width

A = L·W

A = 6000 yd
L = 60 yd

subtitute

60W = 6000 |divide both sides by 60

W = 100 (yd)

A bank pays 5% interest compounded annually. What principal will grow to $12,000 in 10 years.

Answers

Answer: 7366.96 dollars

========================================================

Use the compound interest formula:

A = P(1+r/n)^(n*t)

where in this case,

A = 12000 = amount after t years

P = unknown = deposited amount we want to solve for

r = 0.05 = the decimal form of 5% interest

n = 1 = refers to the compounding frequency (annual)

t = 10 = number of years

-------

Plug all these values into the equation, then solve for P

A = P(1+r/n)^(n*t)

12000 = P(1+0.05/1)^(1*10)

12000 = P(1.05)^(10)

12000 = P(1.62889462677744)

12000 = 1.62889462677744P

1.62889462677744P = 12000

P = 12000/1.62889462677744

P = 7366.95904248911

P = 7366.96

Two urns each contain green balls and blue balls. Urn I contains 4 green balls and 6 blue balls, and Urn II contains 6 green balls and 2 blue balls. A ball is drawn at random from each urn. What is the probability that both balls are blue?A. 2/51

B. 3/20

C. 1/10

D.4/153

Answers

Answer: B. $(3)/(20)$

Step-by-step explanation:

Let A be the event that a blue ball is drawn from urn l and let B be the event that a blue ball is drawn from urn ll.

Then P(A)= $\frac{\text{number of blue balls}}{\text{total balls}}$

$=(6)/(10)=(3)/(5)$

and P(B)= $\frac{\text{number of blue balls}}{\text{total balls}}$

$=(2)/(8)=(1)/(4)$

As both the events are independent, thus the probability that both balls are blue = $P(A)*\ P(B)=(3)/(5)*(1)/(4)=(3)/(20)$

2/10+6/8=8/80=1/10

C.1/10

Given (x)=-x²+2x,determine
F'(x) using first principle

Answers

Hello,
which principle?

f(x)=-x²+2x
==>f'(x)= -2x+2

You mean maybe this

$\lim_(h \to 0) \frac{f(x+h)-f(x) } {h}$

f(x+h)=-(x+h)²+2(x+h)= -(x²+2hx+h²)+2x+2h
f(x)=-x²+2x

$\lim_(h \to 0) \frac{f(x+h)-f(x) } {h}=\lim_(h \to 0)(-2hx-h^2+2h)/(h)=\lim_(h \to 0)(-2x-h+2)/(1)=-2x+2$

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