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Let $f$ be the function $f: x \mapsto x^2 - 3x + 12$ - Junior Cycle Mathematics - Question 13 - 2013

Question 13

$Let-$f$-be-the-function-$f:-x-\mapsto-x^2---3x-+-12$-Junior Cycle Mathematics-Question 13-2013.png$

Let $f$ be the function $f: x \mapsto x^2 - 3x + 12$. Let $g$ be the function $g: x \mapsto 2^{x-1}$. Show that $f(4) = g(5).$

Worked Solution & Example Answer:Let $f$ be the function $f: x \mapsto x^2 - 3x + 12$ - Junior Cycle Mathematics - Question 13 - 2013

Step 1

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Answer

To find $f(4)$ , we substitute 4 into the function:

$f(4) = (4)^2 - 3(4) + 12$

Calculating each term, we have:

$f(4) = 16 - 12 + 12 = 16.$

Step 2

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Answer

Next, we find $g(5)$ by substituting 5 into the function:

$g(5) = 2^{5-1} = 2^{4}.$

Calculating this, we have:

$g(5) = 16.$

Step 3

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Answer

From our calculations, we observed:

Thus, we conclude that: $f(4) = g(5) = 16.$

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