Differentiate y = x³ e^2x

It is known at the beginning of winter in a large population, 15% of the people in the population will be infected with a particular virus. Four people are selected at random, find the probability that at least one of them has the virus. Give your answer to 3 decimals.

Three towns, A, Band C form a triangle. Town A is 80km from Town B and Town C is 40km from Town A.

The bearing of Town B from Town A is 130 degrees.

The bearing of Town C from Town A is 240 degrees.

Find the distance between Town B and Town C, to the nearest km. 

Solve 3|2x + 1| = 21

Find the sum of the first 12 terms of the series 

2 + 11 + 20 + 29 + ... 

Integrate cos x between the bounds of pi/4 and pi/3, leaving your answer to 2dp

P (X = 1) = 0.6

P (X = 2) = 0.11

P (X = 3) = 0.08

P (X = 4) = 0.2

P (X = 5) = 0.01

Find P(X>=4|X>2)

Solve 2cos²x - 3cosx - 2 = 0 for 0 < x < 180 degrees

State the coordinates of the image of A after the following transformations:

- dilation, scale factor of 2 in the y-direction

- reflection in the x- axis

- translation 5 units to the left in the x-direction

Find the value(s) of m given that m, 3m, m²+20 are consecutive terms of a G.P. 

The curve g(x) passes through (-2, 3) and has a gradient function of g'(x)=3x⁵ - 4x + 1. Find g(6)

100 students are in Year 12. They are asked whether they do Cross Fit or Swimming. 48 students do neither sports, while 37 swim and 21 do Cross Fit.

Find the probability that a student swims, given that they do not do Cross Fit.

cot x = - 0.4, with x being an obtuse angle.

Find the value of sec x. 

For what values does kx² - 2x + 2 = 0 have no real roots?

What is the value of:

ln 2 + ln 4 + ln 8 + ... + ln 2²ⁿ