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

Question

asked Aug 5, 2021 189k views

1 Answer

Kornel Kisielewicz · Answer 1 · 2021-08-09T13:42:17+0000

Answer:

See explanation

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) * 10+150*10^(-3) * 10

We can now use rules of exponents to simplify further:

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

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