4.8 * 10^24 - 7.9 * 10^25 in exponential form

Question

asked Dec 22, 2024 15.4k views

1 Answer

Vangos · Answer 1 · 2024-12-26T07:24:34+0000

Answer:

-7.42 × 10²⁵

Explanation:

Given expression:

4.8* 10^(24)-7.9 * 10^(25)

Rewrite the second exponent as (1+24):

$\implies 4.8* 10^(24)-7.9 * 10^((1+24))$

$\textsf{Apply the exponent rule:} \quad a^(b+c)=a^b \cdot a^c$

$\implies 4.8* 10^(24)-7.9 * 10^1 * 10^(24)$

Simplify:

$\implies 4.8* 10^(24)-7.9 * 10 * 10^(24)$

$\implies 4.8* 10^(24)-79 * 10^(24)$

Factor out the common term 10²⁴:

$\implies (4.8-79)10^(24)$

Carry out the subtraction inside the parentheses:

$\implies -74.2 * 10^(24)$

To write the answer in scientific notation
a * 10^n then 1 ≤ a < 10.

Therefore, divide -74.2 by 10, which means we need to multiply 10²⁴ by 10:

$\implies -74.2 / 10 * 10^(24) * 10$

$\implies -7.42 * 10^(24) * 10^1$

$\implies -7.42 * 10^((24+1))$

$\implies -7.42 * 10^(25)$