How do you solve $5(2)^(2x)-4=13$ ?

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Answer 1 · 2017-01-27T21:42:48

Please see the explanation.

Add 4 to both sides:

$5(2)^(2x) = 17$

Divide both sides by 5:

$(2)^(2x) = 17/5$

Use the natural logarithm on both sides:

$ln((2)^(2x)) = ln(17/5)$

Use the property $ln(a^b) = (b)ln(a)$

$(2x)ln((2)) = ln(17/5)$

Divide both sides by 2ln(x):

$x = ln(17/5)/(2ln(2))$

check:

$5(2)^(2(ln(17/5)/(2ln(2)))) - 4 = 13$

$5(2)^((ln(17/5)/(ln(2)))) - 4 = 13$

$5(2)^((log_2(17/5)) - 4 = 13$

$5(17/5) - 4 = 13$

$17 - 4 = 13$

$13 = 13$

$x = ln(17/5)/(2ln(2))$ checks.

How do you solve 5(2)^(2x)-4=135(2)^(2x)-4=13?