Definition
The multiplicative property of equality states that we can multiply ordivide both sides of an equation by the same nonzero number oralgebraicexpression without changing the solution.
If a, b and c are any three numbers
If a = b, and c 0, then
1. a × c = b × c
2. a ÷ c = b ÷ c
Example 1
Solve for x
2x = 3.58
Solution
Step 1:
To solve for x, we must isolate x. On left side of equation, we have 2x; to isolate x, we must divide by 2.
Step 2:
From the multiplicative property of equality with decimals we must divide both sides of an equation by the same number. So, we divide the both sides by 2 to get
2xx=3.582
Step 3:
Simplifying
3.582=1.79
So, the solution is x = 1.79
Example 2
Solve for x
x3=4.27
Solution
Step 1:
To solve for x, we must isolate x. On left side of equation, we have x3; to isolate x, we must multiply by 3.
Step 2:
From the multiplicative property of equality with decimals we must multiply both sides of an equation by the same number. So, we multiply both sides by 3 to get
x3×3=4.27×3
Step 3:
Simplifying
4.27 × 3 = 1281
So, the solution is x = 12.81
Leave a Reply