Fun wit Calculus.....

Chain Rule

Implicit Derivatives

Mean Value Theorem

1st d/dx Test 4 Local max/mins

100

d/dx (e^x) = ?

e^x

100

dy/dx (y) = ?

equals dy/dx

100

What are the conditions of the Mean Value Theorem?

Continuous over [a,b], differentiable on (a,b)

100

If there is an open interval containing c on which f(c) is a maximum, then f(c) is called what? What is f(c) when the open interval is a minimum?

When f(c) is a maximum f(c) is a relative maximum, and when f(c) is a minimum f(c) is a relative minimum

100

if f' changes from positive to negative as x passes through c, then f has a local ?

Max at c

200

d/dx (cos(2x)) = ?

answer: -2sin(2x)

200

2y²−x²+x³y=2

find dy/dx

dy/dx = (2x−3x²y) / (4y+x³)

200

I slope of the f'(c) line, the secant line or the tangent line?

Tangent line

200

What are the condtions of the Extreme Value Theorem?

f(x) must be continuous over [a,b]

200

if f' changes from negative to positive as x passes through c, then f' has a local ?

Min at c

300

d/dx (ln(2x³ − 8x⁵)) = ?

(6x²-40x⁴) / (2x³-8x⁵)

300

y + xy − 2x³ = 2

find dy/dx

dy/dx = (-y - 6x²) / x

300

What is the Mean Value Theorem equation?

f'(c) = (f(b)-f(a)) / (b-a)

300

f(−2)=−5 and f'(-2)=-9 ′

if x equals -2 what is the equation of the tangent line?

A) y - 2 = 9(x-5) or B) y + 5 = 9(x+2)

y + 5 = 9(x+2)

300

if f' does not change sign at c (so that f' is positive on both sides of c or negative on both sides of c), then f ?

Neither local Max/MIn

400

d/dx (cos²(x²)) = ?

2(cos(x²))(-sin(x²)(2x) or -4x(sin(x²))(cos(x²))

400

x³y−2x³+y⁴=8

find dy/dx

dy/dx = (-3x²y+6x²) / (x³+4y³)

400

g(x) = √(5x-1) and let c be the number that satisfies the Mean Value Theorem for g on the interval [1,10]. What is the value of c?

C = 4.25

g′(c)= (f(10)−f(1)) / (10−1)

f(10)−f(1)) / (10−1)=((7−2) / 9) = (5/9)

g'(x) = (5/9) = 4.25

400

The tangent line of the function f(x) at the point (1,5) passes through the point (3,4)

what is f'(x)

slope = (4-5) / (3-1)

slope = -1/2

f'(x) = -(1/2)

400

Part 1)

f(x) = (x²-1)²

Identify all critical points

x = 0,1,-1

500

d/dx ( ((3x³+2x²)/(x))²) = ?

36x³+36x²+8x

500

y = ³√(2 + tan (x2))

find dy/dx

dy/dx = (2/3) x sec² (x² )(2 + tan (x²))^-(2/3)

500

f(x)= √(4x-3) and let c be the number that satisfies the Mean Value Theorem for f on the interval 1 ≤ x ≤ 3. what is c?

C = 1.75

f'(c) = (f(3)−f(1)) / ((3)-(1)) = ((3-1) / 2) = 1

f'(x) = (2 / (√(4x-3))

x = 1.75

500

find the Tangent line

y=x²-2x-3

x= -4

y−27=-10(x+4)

500

Part 2)

f(x) = (x²-1)²

Find the intervals where the function is increasing or decreasing

Increasing: [-1,0] u [1, ∞)

Decreasing: (-∞,-1] u [0,1]