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35 votes
Which graph represents the equation

Which graph represents the equation-example-1
User Fahri Azimov
by
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1 Answer

27 votes
27 votes

Answer:

First graph

Explanation:

To identify which graph represents the equation, we can find an x-intercept of a function by substituting y = 0 in.

That will result with
\displaystyle{0 = \log_3 x + 1}. Then we solve the equation for x:


\displaystyle{-1 = \log_3 x}

Apply logarithm conversion to exponential:


\displaystyle{\log_a b = n \to a^n = b}

Therefore:


\displaystyle{\log_3 x = -1 \to 3^(-1) = x}

Apply law of exponent for negative exponent to simplify:


\displaystyle{a^(-n) = (1)/(a^n)}

Therefore:


\displaystyle{x = 3^(-1)}\\\\\displaystyle{x = (1)/(3)}

Since the logarithm has positive integer base then we can cut off choice 2 and choice 3 since that only applies to negative logarithm and fraction base of logarithm.

The only choices we have are first and fourth but fourth graph has x-intercept equal to 3. However, we solve for x-intercept and receive 1/3 as our x-intercept which is between 0 and 1.

Henceforth, the first graph represents the equation.

User JTG
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3.1k points