Question

Choose the correct option.
Use the properties of logarithms to solve the following equation.
log((ab(d+2))/(C3))​

Answer 1

Answer:

log ab(d+2)-logc3

i am just guessing this

Answer 2

The solved equation is log (a)+log (b)+log(d+2)-log(C3).

Given:

log((ab(d+2))/(C3))​ -----(1)

To Find:

We are required to solve the given equation by using the properties of logarithms.

Solution:

The properties used to solve the given equations are

1) log (a/b) = log a-log b

2) log (ab) =log a+log b

By using property(1) in equation(1), we get

log((ab(d+2))/(C3)) = log(ab(d+2))-log(C3) ----(2)

By using property(2) in equation(2), we get

log(ab(d+2))-log(C3 = log(ab)+log(d+2)-log(C3) ----(3)

Again using property(2) in equation(3), we get

log(ab)+log(d+2)-log(C3) = log a+log b+log(d+2)-log(C3)

Therefore, The solved equation is log (a)+log (b)+log(d+2)-log(C3).

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