Pure Year 2 Unit 9

Question 1

differentiate sin(kx)

Answer 1

k cos(kx)

Question 2

differentiate cos(kx)

Answer 2

-k sin(kx)

Question 3

differentiate e^(kx)

Answer 3

ke^(kx)

Question 4

differentiate ln(x)

Answer 4

1/x

Question 5

differentiate a^(kx)

Answer 5

(a^(kx))(k)(ln(a))

Question 6

What is the chain rule?

Answer 6

dy/dx = dy/du x du/dx

Question 7

How to get from dx/dy to dy/dx

Answer 7

dy/dx = 1 / dx/dy

Question 8

What is the product rule?

Answer 8

if y=uv, then dy/dx = u(dv/dx) + v(du/dx)

Question 9

What is the quotient rule?

Answer 9

if y=u/v, then dy/dx = (v(du/dx) - u(dv/dx))/v^2

Question 10

Differentiate tan(kx)

Answer 10

k sec^2 (kx)

Question 11

differentiate cosec(kx)

Answer 11

-k cosec(kx)cot(kx)

Question 12

differentiate sec(kx)

Answer 12

k sex(kx)tan(kx)

Question 13

differentiate cot(kx)

Answer 13

-k cosec^2 (kx)

Question 14

For parametric functions, how do you get dy/dx?

Answer 14

dy/dt / dx/dt

Question 15

How to do implicit differentiation?

Answer 15

Differentiate the y like an x then multiply it by dy/dx

Question 16

f(x) is concave if f’‘(x) is what?

Answer 16

less than or equal to 0

Question 17

f(x) is convex if f’‘(x) is what?

Answer 17

greater than or equal to 0

Question 18

What is the point called where a curve changes from concave to convex or vice versa?

Answer 18

The point of inflection

Question 19

How is the point of inflection seen mathematically?

Answer 19

f’‘(x) changes signs