Math  /  Calculus

QuestionLet f(x)=3xf(x) = 3^{-x}. Find f(x)f'(x).

Studdy Solution

STEP 1

What is this asking? We need to find the *derivative* of the function f(x)=3xf(x) = 3^{-x}, which means we're looking for the **instantaneous rate of change** of f(x)f(x) at any given xx. Watch out! Negative exponents can be tricky!
Don't forget the chain rule, and remember your exponent rules.

STEP 2

1. Rewrite with *e*
2. Apply the chain rule
3. Simplify

STEP 3

Let's **rewrite** our function f(x)=3xf(x) = 3^{-x} using the **magical number** *e*!
Remember, we can rewrite any exponential function axa^x as eln(a)xe^{\ln(a) \cdot x}.
Why? Because eln(a)=ae^{\ln(a)} = a!
It's like a **secret code**!

STEP 4

So, for our function, we have f(x)=3x=eln(3)(x)=eln(3)xf(x) = 3^{-x} = e^{\ln(3) \cdot (-x)} = e^{-\ln(3) \cdot x}.
See how we brought that negative sign out front? **Clean and crisp**!

STEP 5

Now, it's **chain rule time**!
Remember, the chain rule says that the derivative of a **composite function** like eu(x)e^{u(x)} is eu(x)u(x)e^{u(x)} \cdot u'(x).
It's like peeling an onion, layer by layer!

STEP 6

In our case, u(x)=ln(3)xu(x) = -\ln(3) \cdot x, so u(x)=ln(3)u'(x) = -\ln(3).
See? The derivative of xx is just **1**, and the ln(3)-\ln(3) is just a **constant** hanging out.

STEP 7

Putting it all together, we get f(x)=eln(3)x(ln(3))f'(x) = e^{-\ln(3) \cdot x} \cdot (-\ln(3)). **Boom**!

STEP 8

Let's make this look **nice and tidy**.
Remember how we rewrote 3x3^{-x} as eln(3)xe^{-\ln(3) \cdot x}?
Well, now we can **switch it back**!

STEP 9

So, we have f(x)=3x(ln(3))f'(x) = 3^{-x} \cdot (-\ln(3)).
We can write this even more neatly as f(x)=ln(3)3xf'(x) = -\ln(3) \cdot 3^{-x}. **Perfect**!

STEP 10

The derivative of f(x)=3xf(x) = 3^{-x} is f(x)=ln(3)3xf'(x) = -\ln(3) \cdot 3^{-x}.

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