All categories

3 years ago

How do I convert two fifths and one third into seventy fifths?

1 answer:

vladimir1956 [14]3 years ago

5 0

So basically, you take the denominator (the bottom part of a fraction) and see how many times it goes into 75. For example, 3/10= 9/30. Also, you take the number that you multiplied for the denominator and multiply by the numerator too.

You might be interested in

The table shows conversions of common units of length.

luda_lava [24]

The answer for this questions would be: D. 120

3 0

3 years ago

Read 2 more answers

Anyone know please ????

nika2105 [10]

Answer:

16/5

2/5

Step-by-step explanation:

8 0

2 years ago

Read 2 more answers

How is the Distributive Property used to simplify operations with scientific notation

Citrus2011 [14]

Answer:

See explanation

Step-by-step explanation:

Let a,b, and c be real numbers.

The distributive property says that:

$a(b + c) = ab + ac$

Assuming we want to simplify:

$10(5*10^{-1}+150*10^{-3})$

We apply the distributive property to get:

$10(5*10^{-1}+150*10^{-3}) = 5*10^{-1} \times 10+150*10^{-3} \times 10$

We can now use rules of exponents to simplify further:

$10(5*10^{-1}+150*10^{-3}) = 5*10^{-1} \times 10^{1} +150*10^{-3} \times 10^{1}$

$10(5*10^{-1}+150*10^{-3}) = 5*10^{-1 + 1} +150*10^{-3 + 1}$

$10(5*10^{-1}+150*10^{-3}) = 5*10^{0} +150*10^{-2}$

$10(5*10^{-1}+150*10^{-3}) = 5*1+1.50*10^{-2}x {10}^{2}$

$10(5*10^{-1}+150*10^{-3}) = 5*1+1.50*10^{-2 + 2}$

$10(5*10^{-1}+150*10^{-3}) = 5+1.50*10^{0} = 6.5 \times {10}^{0}$

4 0

3 years ago

Given the right triangle below, if AB = 12 and BC = 5, find AC.

jolli1 [7]

Answer:

The Answer Is On The Image

Step-by-step explanation:

Thanks.............

8 0

2 years ago

Read 2 more answers

QUICKLY!! TEN POINTS!! BRAINLIEST FOR WHOEVER GETS IT RIGHT!!

Lana71 [14]

Answer:

Step-by-step explanation:

count how many box's are they away from the y axis

5 0

3 years ago

Read 2 more answers