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Find the value of y Log^2 32=y

Find the value of y Log^2 32=y
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Find the value of y Log^2 32=y

User TheLetterN
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7 votes

Answer:

Explanation:

First of all, I have a strong feeling that that is supposed to be


log_2(32)=y so I'm going to go with that. We can solve for y by rewriting that in exponential form. Exponential form and log form are inverses of each other. If the log form of an equation is


log_b(x)=y, the exponential form of it is


b^y=x. We will apply that here to solve for y:


2^y=32

which is asking us, "2 to the power of what equals 32?". We can use our calculator to raise 2 to consecutive powers til we reach the one that gives us a 32, or we could solve it by writing the 32 in terms of a 2:


2^y=2^5

Since both bases are the same, 2, then the exponents are equal to one another. y = 5. This is an important rule to remember while solving either log or exponential equations.

User Paul Hodgson
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