Question

Solve for inequality:
4^x+
2^(x+1)
-24 = 0
​

Answer 1

Answer:

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Step-by-step explanation:

4^x + 2^(x+1 ) -24 =0

4^x + 2^(x+1 ) -24 =04^x + 2^(x+1 ) = 24

4^x + 2^(x+1 ) -24 =04^x + 2^(x+1 ) = 24{(2)^2}^x + 2^(x+1) =24

4^x + 2^(x+1 ) -24 =04^x + 2^(x+1 ) = 24{(2)^2}^x + 2^(x+1) =242^(2x) + 2^( x+1 ) =24

2^ ( 3x +1) =24

It is not an algebraic expressions.

lt will be solved by logarithm.