IB Review

Number and Algebra

Functions

Geometry and Trig

Statistics and Probability

Calculus

100

Write 4568730349544 in scientific notation with the correct number of significant figures

4.56x10¹²

100

The cost of renting a bike is modeled by: C(h)=5+3h, where h is hours.

State the meaning of the number 5.

The fixed starting cost.

100

Find cos(60)

1/2

100

State the median of: 3,5,7,9,11

100

State what a derivative represents

Instantaneous rate of change/ slope of the tangent line

200

A sequence is defined by U(n)=200(0.85)ⁿ

Explain what the number 0.85 means in this context

A 15% decrease

200

A linear model has gradient 2 and passes through (0,3). Write down the equation.

y=2x+3

200

A ladder leans against a wall forming a 70 degree angle with the ground. The ladder is 5m long.

Find the height it reaches the wall.

4.7 meters high

200

A bag contains 3 red and 2 blue balls. One ball is chosen at random. Find the probability it is blue

2/5

200

Find the derivative of 4x³

12x²

300

A bank offers 3% annual interest, compounded yearly.

Find the value of $1000 after 2 years

$1060.90

300

A ball's height is modeled by:

h(t)=-5t²+20t+1, with t in seconds

Determine when the ball will hit the ground.

4.05 seconds

300

Find the area of a triangle with sides 6cm, 8cm, and included angle 30 degrees.

12 cm²

300

The correlation coefficient is r=0.62.

Describe the relationship

Moderate positive correlation

300

Find the integral of 12x³+2x

3x⁴+x²+C

400

A student needs at least 60 marks to pass.

Their score is modeled by:

S=12x+18

Find the minimum value of x needed to pass

x is less than or equal to 3.5

400

A quadratic regression gives y=-1.5x²+12x+3

State the maximum value of y and what it represents

Max y-value = 27

Represents maximum output/height/etc.

400

A circle has radius 4m. Find the arc length for an angle of 85 degrees

5.93

400

A regression model gives y=4.2x+10.

Interpret the value 4.2

For each 1-unit increases in x, y increases by 4.2

400

Explain how to find the minimum or maximum of a function using the derivative

Find the derivative of the function.

Set the derivative equal to 0 and solve for x.

500

The value of a car is modeled by:

V(t)=25000(0.78)^t, where t is years.

Find how long it takes for the car's value to drop below $10,000

t=4.5

Between 4 and 5 years

500

A model f(x) is used to predict profit.

Explain one limitation of using this model outside the given data range

Extrapolation

Trends may not continue beyond observed data

(Other reasonable explanations may also work)

500

The temperature is modeled by T(t)=18+6sin(3(t-4))

State: the amplitude, the period, and what the value 4 represents

Amplitude=6

Period=2pi/3

4 is the horizontal shift (phase shift)

500

If a hypothesis test with a significance level 0.05 gives a p-value of 0.023.

State the conclusion of this test

Reject the null hypothesis.

500

The number of people entering a theme park is modeled by the function N(t), where t is time in hours.

The derivative N'(t) is positive for 0<t<5, and negative for t>5.

Explain what this tells you about the number of people in the park.

N'(t)>0: the number of people is increasing

N'(t)<0: the number of people is decreasing