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AP Calculus BC › Calculus Review

Questions 1 - 10

Use a definition of the derivative with the function to evaluate the following limit:

$\lim_{h \to 0}\frac{a^h-1}{h}$

$\ln(a)$

Explanation

Using the definition $f'(x) = \lim_{h \to 0}\frac{f(x+h)-f(x)}{h}$

And plugging in our function, we get that

$(a^x)' = \lim_{h \to 0}\frac{a^{x+h}-a^x}{h}$ .

if we factor out inside the limit we get $\lim_{h\to 0} a^x(\frac{a^h-1}{h})$

since the term doesn't contain an h we can factor it out, and then divide by both sides, getting that

$\frac{(a^x)'}{a^x} = \lim_{h\to 0}\frac{a^h-1}{h}$

but we know that $(a^x)' = a^x \cdot \ln(a)$

So we find that the limit is equal to $\ln(a)$ .

Find the absolute maxima of the following function on the given interval:

on the interval

Explanation

To find the absolute extrema of a function on a closed interval, one must first take the first derivative of the function.

The derviatve of this function by the power rule is as follows:

The relative extrema is when the first derivative is equal to 0, that is, there is a change in slope.

Solving for x when it is equal to zero derives:

Diving by 6 and factoring gives or however, since we are concerned with the interval (-2,0) our x value is -1.

We now however must find the value of f(x) at -1

Find the absolute maxima of the following function on the given interval:

on the interval

Explanation

To find the absolute extrema of a function on a closed interval, one must first take the first derivative of the function.

The derviatve of this function by the power rule is as follows:

The relative extrema is when the first derivative is equal to 0, that is, there is a change in slope.

Solving for x when it is equal to zero derives:

Diving by 6 and factoring gives or however, since we are concerned with the interval (-2,0) our x value is -1.

We now however must find the value of f(x) at -1

Explanation

Evaluate $\frac{d}{dx}(xe^{\sin x})$

$(x\cos x+1)e^{\sin x}$

$xe^{\sin x}$

$(x\sin x +1)e^{\sin x}$

$(xe^{\cos{x}}+1)x$

None of the other answers

Explanation

To evaluate this derivative, we use the Product Rule.

$\frac{d}{dx}(xe^{\sin x})$

$= (x)(\cos xe^{\sin x})+(1)(e^{\sin x})$ . Use the Product Rule. Keep in mind that the derivative of $e^{\sin x}$ involves the Chain Rule.

$=(x\cos x +1)e^{\sin x}$ . Factor out an $e^{\sin x}$ .

Evaluate $\frac{d}{dx}(xe^{\sin x})$

$(x\cos x+1)e^{\sin x}$

$xe^{\sin x}$

$(x\sin x +1)e^{\sin x}$

$(xe^{\cos{x}}+1)x$

None of the other answers

Explanation

To evaluate this derivative, we use the Product Rule.

$\frac{d}{dx}(xe^{\sin x})$

$= (x)(\cos xe^{\sin x})+(1)(e^{\sin x})$ . Use the Product Rule. Keep in mind that the derivative of $e^{\sin x}$ involves the Chain Rule.

$=(x\cos x +1)e^{\sin x}$ . Factor out an $e^{\sin x}$ .

What is the first derivative of the following function?

$f'(x)=-lnxsin(sinx)cosx+\frac{cos(sinx)}{x}$

$f'(x)=-lnxcos^{2}xcos(sinx)$

$f'(x)=lnxsin(sinx)cosx+\frac{cos(sinx)}{x}$

$\frac{-cos(sinx)}{x^{2}}$

$\frac{-sin(sinx)cosx)}{x}$

Explanation

We use the product rule to differentiate this function. Applying it looks like this:

$f'(x)=\frac{\mathrm{d} }{\mathrm{d} x}lnx(cos(sinx))+lnx\frac{\mathrm{d} }{\mathrm{d} x}cos(sinx)$

This simplifies to:

$\frac{cos(sinx)}{x}+\frac{\mathrm{d} }{\mathrm{d} x}cos(sinx)lnx$

We apply the chain rule to differentiate , which becomes . Plugging this into the above equation gives us:

$\frac{cos(sinx)}{x}-lnxsin(sinx)cosx$ or $-lnsin(sinx)cosx+\frac{cos(sinx)}{x}$

What is the first derivative of the following function?

$f'(x)=-lnxsin(sinx)cosx+\frac{cos(sinx)}{x}$

$f'(x)=-lnxcos^{2}xcos(sinx)$

$f'(x)=lnxsin(sinx)cosx+\frac{cos(sinx)}{x}$

$\frac{-cos(sinx)}{x^{2}}$

$\frac{-sin(sinx)cosx)}{x}$

Explanation

We use the product rule to differentiate this function. Applying it looks like this:

$f'(x)=\frac{\mathrm{d} }{\mathrm{d} x}lnx(cos(sinx))+lnx\frac{\mathrm{d} }{\mathrm{d} x}cos(sinx)$

This simplifies to:

$\frac{cos(sinx)}{x}+\frac{\mathrm{d} }{\mathrm{d} x}cos(sinx)lnx$

We apply the chain rule to differentiate , which becomes . Plugging this into the above equation gives us:

$\frac{cos(sinx)}{x}-lnxsin(sinx)cosx$ or $-lnsin(sinx)cosx+\frac{cos(sinx)}{x}$

Evaluate the derivative of , where is any constant.

None of the other answers

Explanation

For the term, we simply use the power rule to abtain . Since is a constant (not a variable), we treat it as such. The derivative of any constant (or "stand-alone number") is .

Evaluate the derivative of , where is any constant.

None of the other answers

Explanation

For the term, we simply use the power rule to abtain . Since is a constant (not a variable), we treat it as such. The derivative of any constant (or "stand-alone number") is .

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