Answer:
0.540
Step-by-step explanation:
Hi there,
To get started in order to solve this, please recall the property of logarithms.
This question is a bit tricky, but doable. Best way to solve this is first compare the two functions:
[tex]f(x) = cx^{k} \\ f(13)=4f(1)[/tex]
Now, let's see what the function gives at 13 and 1:
[tex]f(13)=c13^{k}\\f(1)=c1^{k}[/tex]
Something to recognize is that 1 to the power of anything is just 1, so f(1) is reduced to:
[tex]f(1)=c[/tex] We are making progress!
Next, we can set both f(13) forms equivalent to each other, watch this:
[tex]f(13)=f(13) = 4f(1)[/tex] but we know what f(1) is equal to, and let's substitute our knowns:
[tex]c13^{k}=4c1^{k} = 4c[/tex] the c constant on both left and right side cancel out:
[tex]13^{k}=4[/tex] Now, take the logarithm form of both side of the equation. I used natural log, but you can also use common logs:
[tex]ln(13^{k})=ln(4)[/tex] ⇒ [tex]k*ln(13)=ln(4)[/tex] this was performed using the power log rule.
Isolate k:
[tex]k=\frac{ln(4)}{ln(13)} =0.540[/tex] using a calculator.
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thanks,
