For clarity, here is the conclusion in fraction notation:

$\frac{1}{a} \cdot \frac{1}{b} = \frac{1}{a \cdot b}$

This theorem states that when we are multiplying fractions, and the numerator is 1, then we can just multiply the denominators.

Before you read the proof, we encourage you to try to prove this theorem on your own.

This proof multiplies both sides of = by a ⋅ b and shows that both sides become 1. This means that the two sides are equal. The proof then divides both sides by a ⋅ b to reach the conclusion.

Quiz (1 point)

Given that:

not (a = 0)

not (b = 0)

not (a ⋅ b = 0)

Prove that:

(1 / a) ⋅ (1 / b) = 1 / (a ⋅ b)

The following properties may be helpful:

if not (s = 0), then s ⋅ (1 / s) = 1
if the following are true:
- not (a = 0)
- not (b = 0)
then (a ⋅ b) ⋅ ((1 / a) ⋅ (1 / b)) = 1
if the following are true:
- a = c
- b = c
then a = b
if the following are true:
- a ⋅ x = a ⋅ y
- not (a = 0)
then x = y

Please write your proof in the table below. Each row should contain one claim. The last claim is the statement that you are trying to prove.

Step	Claim	Reason (optional)	Error Message (if any)
1
2
3
4
5
6
7
8
9
10

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