Question

Given log4^3 =0.792 and log4^ 21=2.196 what is log4^7

1.404
1.739
2.773
2.988

Answer 1

Answer: The correct answer 1.404

Explanation:

`\log4^3=0.792`

`\log4^(21)=2.196`

`\log4^(21)=\log(4^(3)*4^(7))=\log4^3+\log4^7=2.196`

`\log4^7=2.196-\log4^3=2.196-0.792=1.404`

The correct value of
`\log4^7` is 1.404. so the correct option from the given option is 1.404.

Answer 2

We have to find log4^7 if we know that log4^3 = 0.792 and log4^21 = 2.196.
We already know that:
log ( x/y ) = log x - log y
log4^21 = log4^( 21 / 3 ) =
= log4^ 21 - log4^ 7 = 2.196 - 0.797 = 1.404
Answer:
A ) 1.404