Derivative Rules Jeopardy Template

Trig functions

Mix It Up

Power Rule

Quotient Rule

Product Rule

100

Given: f(x) = 3tan(x), determine f'(x).

f'(x) = 3sec²(x)

100

Determine the derivative of y = sqrt(x)-cuberoot(x²).

Write your answer with positive exponents.

dy/dx =1/(2 sqrt(x))- 2/(3cuberoot(x))

100

Determine f'(x) for: f(x) = 2pi

100

Given f(x) = 2/(2x⁴-5), determine f'(x).

f'(x) = -16x³/(2x⁴-5)²

100

Given f(x) = -x³(3x⁴ - 2), find the second derivative, f''(x), of f(x).

f''(x) = -126x⁵ + 12x

200

What is the derivative of y = sec(x)?

dy/dx = sec(x)tan(x)

200

Given f(x) = 7x³ - 3/x² + 12, determine f'(1) and use this to determine if f(x) is increasing, decreasing or neither at x = 1.

f'(1) = 18

f(x) is increasing at x = 1 since f'(1) > 0.

200

Given f(x) = 4x⁴ − 5x − 3e², determine f '(x),

f '(x) = 16x³− 5

200

Given y = (lnx)/(3x³-2x), determine dy/dx.

dy/dx = ((3x³-2x)(1/x)-(lnx)(9x²-2))/(3x³-2x)²

or simplified

dy/dx = ((3x²-2)-(lnx)(9x²-2))/(3x³-2x)²

200

Determine f'(x): f(x) = (5x⁵+5)(-2x⁵-3)

and simplify your answer.

f'(x) = -100x⁹ - 125x⁴

300

Given f(x)= x² - sin(x), then determine f'(x) and f'(pi).

f'(x) = 2x - cos(x)

f'(pi) = 2pi + 1

300

Determine the slope of a line normal to the tangent line at x = -1 for f(x) = -(x + 7x²)

-1/13

300

Given f(x)=3/x³ , then determine f'(x). Use it to write the equation of the tangent line at x = -1.

f'(x)= -9/x⁴

The equation of the tangent line at x = -1 is

y +3 = -9(x + 1)

300

Given y = 2cosx/e^x determine dy/dx and then name the slope of the tangent line at x = 0.

dy/dx = (-2e^xsinx - 2e^xcosx)/e^2x

The slope of the tangent line at x = 0 is -2.

300

Write the function for the instantaneous rate of change of f(x) = 2x³sinx.

IROC = 2x³cosx+ 6x²sinx

400

If f(x)=sin(x)cos(x), then determine f'(x) and f'(pi/3).

f'(x)=cos²(x)-sin²(x)

or f'(x)=-sin²(x)+cos²(x)

f'(pi/3) = -1/2

400

Determine the equation of a line tangent line to f(x) at x = 2 and f(x) = (3x - 7)².

y - 1 = -6(x - 2)

400

Given y = (4x³- 2x² + 10)/(2x), determine dy/dx. Then determine the slope of the tangent line at x = -1.

dy/dx = 4x -1 -5x^-2

The slope of the tangent line at x = -1 is -10.

400

Given g(x) = 2x³/lnx, determine g'(x).

g'(x) = (6x²lnx - 2x²)/(lnx)²

400

Determine the slope of the tangent when x = pi

y = cos(x)(1 + x²)

y' = -sin(x)(1+x²)+cos(x)(2x)

slope of the tangent when x = pi is -2pi

500

If f(x)=cot(x)/(sin(x)+1), then determine f'(x).

f'(x)=((-csc²(x)(sin(x)+1))-(cos(x)cot(x))) /(sin(x)+1)²

500

Determine the value(s) of x at which the function

f(x) = 4x + 8cosx has a horizontal tangent on the interval [0, 2pi).

At x = pi/6 and x = 5pi/6, f(x) has horizontal tangents.

500

Given f(x) = (1/3)x³- 3x²+ 8x + 25, determine at which x-value(s) where f(x) has a horizontal tangent.

Set f'(x) = 0

At x = 2 and x = 4, f(x) has horizontal tangents.

500

Given h(x) = csc x/(4x²), determine h'(x) and simplify your answer.

h'(x) = (-4x²(csc x)(cot x) - 8xcsc x)/(16x⁴)

simplified

h'(x) = (-x(csc x)(cot x) - 2csc x)/(4x³)

500

Write the equation of the tangent line to

f(x) = (0.5x² - 10)(lnx) at x = 1.

Then use equation of the tangent line to estimate f(1.01).

Equation of the tangent line

y = -9.5(x - 1)

f(1.01) is approximately -0.095