Answer:
35/50
Step-by-step explanation:
Here we will show you how to calculate 3/5 divided by 7/10. We will give you the answer in fraction form and in decimal form.
Here is 3/5 divided by 7/10 displayed
3/5 ÷ 7/10
The numbers in 3/5 divided by 7/10 are labeled below:
3 = dividend numerator
5 = dividend denominator
7 = divisor numerator
10 = divisor denominator
To make it a fraction form answer, you multiply the dividend numerator by the divisor denominator to make a new numerator.
Furthermore, you multiply the dividend denominator by the divisor numerator to make a new denominator:
3 x 10/5 x 7 = 30/35
Thus, the answer to 3/5 divided by 7/10 in fraction form is:
30/50
Answer:
A
Step-by-step explanation:
Rectangular Pyramid
Answer:
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The number of outcomes possible from flipping each coin is 2, therefore;
- The expression that can be used to find the number of outcomes for flipping 4 coins is: 2•2•2•2
<h3>How can the expression for the number of combinations be found?</h3>
The possible outcome of flipping 4 coins is given by the sum of the possible combinations of outcomes as follows;
The number of possible outcome from flipping the first coin = 2 (heads or tails)
The outcomes from flipping the second coin = 2
The outcome from flipping the third coin = 2
The outcome from flipping the fourth coin = 2
The combined outcome is therefore;
Outcome from flipping the 4 coins = 2 × 2 × 2 × 2
The correct option is therefore;
Learn more about finding the number of combinations of items here:
brainly.com/question/4658834
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Solving the expression
we get 
So, Option A is correct.
Step-by-step explanation:
We need to solve the expression: 
Multiplying and dividing by 2-3i

So, solving the expression
we get 
So, Option A is correct.
Keywords: Complex numbers
Learn more about Complex numbers at:
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