Rewrite log12 + log5 as a single term using theproduct rule formula

Rewrite log312 + log311 using theproduct rule formula

log312 + log311 = log3(12 *11) = log3132

Rewrite log511 + log5a using theproduct rule formula

log511 + log5a = log5(11*a) = log511a

Rewrite log20 log5 as a single term using thequotient rule formula

$ log20 -log5 = log(\frac205) = log4 $

Rewrite log2100 log225 as a single term using thequotient rule formula

$ log_2(100) -log_2(25) = log_2(\frac10025) = log_2(4). $

log24 is alogarithm equation that you can solveand get an answer of 2

Rewrite log240 log25 as a single term using thequotient rule formula

$ log_2(40) – log_2(5) = log_2(\frac405) = log_2(8). $

log28 is alogarithm equation that you can solveand get an answer of 3

Rewrite log318 log32 as a single term using thequotient rule formula

$ log_3(18) – log_3(2) = log_3(\frac182) = log_3(9). $

log39 is alogarithm equation that you can solveand get an answer of 2

Rewrite log3x2as a single term using thepower rule formula

Rewrite log39xas a single term using thepower rule formula

Therefore, the final answer is x(2) or 2x

If log x = 4 and log y =2 what is the numeric value of

After applying theserule of logarithms, substitute in the value of log x and log y

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