Excluding trailing zeroes, how many digits does 0.4^24*0.375^22 have to the right of the decimal point?

Question

asked Jul 18, 2019 67.9k views

2 Answers

Sammantha · Answer 1 · 2019-07-21T17:19:04+0000

Answer:

42 digits right of the decimal point.

Explanation:

Trailing zeroes are those which we get in decimal representation and after that there comes no digit.

We have been given the expression:

$0.4^(24)\cdot 0.375^(22)$

We will simplify it to get the result that is the right of the decimal point.

$1.19709242282867431640625\cdot 10^(-19)$

When we will operate
10^(-19) that means decimal point will be shifted 19 digits left of its present position.

Hence, we get:

Hence, 42 digits right of the decimal point.