Practice Paper 1 | DP IB Maths: AA HL Practice Paper Questions 2021

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1

4 marks

Prove that the square of an odd number is always odd.

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2a

2 marks

Show that the equation $2 \sin^{2} x + 3 \cos x = 0$ can be written in the form $a \cos^{2} x + b \cos x + c = 0$ , where $a, b$ and $c$ are integers to be found.

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2b

3 marks

Hence, or otherwise, solve the equation $2 \sin^{2} x + 3 \cos x = 0$ for $- 180 ° \leq x \leq 180 ° .$

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3

5 marks

In the expansion of ${(x + h)}^{5},$ where $h \in ℝ$ , the coefficient of the term in $x^{3}$ is 320.

Find the possible values of $h$ .

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4a

4 marks

The diagram below shows part of the graph of $y = f (x)$ , where $f (x)$ is the function defined by

$f (x) = (x^{2} — 1) In (x + 3), x > — 3$

q4a-practice-paper1-setc-ib-dp-aa-hl

Points $A, B$ and $C$ are the three places where the graph intercepts the $x$ -axis.

Find $f' (x) .$

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4b

2 marks

Show that the coordinates of point $A$ are (-2, 0).

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4c

3 marks

Find the equation of the tangent to the curve at point $A$ .

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5

4 marks

The points A, B, C and D form the vertices of a parallelogram with position vectors $a, b, c$ and $d$ respectively.

Show that the area of the parallelogram is $|a \times b + b \times d + d \times a| .$

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6

7 marks

The following triangle shows triangle ABC, with AB = 3 $a$ , BC = $a$ and AC = 7.

q6-practice-paper1-setc-ib-dp-aa-hl

Given that $\cos A \hat{B} C = \frac{1}{2}$ , find the area of the triangle. Give your answer in the form $\frac{p \sqrt{3}}{r}$ where $p, q \in ℝ$ .

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7a

2 marks

$α$ and $β$ are non-real roots of the equation $x^{2} + 3 k x + 2 k + 1 = 0$ , where $k > 0$ is a constant.

Find $α + β$ and $α β$ , in terms of $k$ .

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7b

2 marks

Given that $α^{2} + β^{2} = 3$ , show that $(α + β)^{2} = 4 k + 5$ .

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7c

3 marks

Hence find the value of

k

.

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8a

4 marks

Two lines, $l_{1}$ and $l_{2}$ , are parallel and their vector equations are given below:

$l_{1} : r_{1} = (\begin{matrix} 2 \\ 1 \\ 10 \end{matrix}) + λ (\begin{matrix} 4 \\ - 2 \\ 2 \end{matrix})$

$l_{2} : r_{2} = (\begin{matrix} - 3 \\ - 1 \\ 0 \end{matrix}) + μ (\begin{matrix} - 2 \\ p \\ q \end{matrix})$

(i) State the values of $p$ and $q$ .

(ii) Show that $l_{1}$ and $l_{2}$ are not collinear.

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8b

5 marks

Find the minimum distance between

l_{1}

and

l_{2}

.

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9

7 marks

Use the substitution $u = \cos x$ to find $\int \frac{\sin x \cos x}{\cos^{2} x + 3 \cos x - 4} d x .$

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10a

4 marks

Consider the function $f$ defined by $f (x) = 3$ $\sin x - 3$ , for $0 \leq x \leq 3 π$
The following diagram shows the graph of $y = f (x)$ q10a-practice-paper1-setc-ib-dp-aa-hl

The graph of f touches the x-axis at point A as shown. Point B is a local minimum of $f$ .
The shaded region is the area between the graph of $y = f (x)$ and the $x$ -axis, between the
points A and B.

Find the $x$ -coordinates of A and B.

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10b

5 marks

Show that the area of the shaded region is 3 $π$ units² .

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10c

2 marks

The right cone in the diagram below has a curved surface area of twice the shaded area in
the previous part of the question.
The cone has a slant height of $3$ , base radius $r$ , and height $h$ .

q10c-practice-paper1-setc-ib-dp-aa-hl

Find the value of $r$ .

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10d

4 marks

Hence find the volume of the cone.

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11a

6 marks

A particle is moving in a vertical line and its acceleration, in ${ms}^{- 2}$ , attime t seconds, $t \geq 0$ is given by $a = - \frac{1 - v}{2},$ where $v$ is the velocity in meters per second and $v < 1 .$

The particle starts at a fixed origin O with initial velocity $v_{o} {ms}^{- 1}$ .

By solving a suitable differential equation, show that the particle’s velocity at time t is given by

v (t) = 1 - e^{- \frac{t}{2}} (1 - v_{o}) .

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11b

4 marks

The particle moves down in the negative direction, until its displacement relative to the origin reaches a minimum. Then the particle changes direction and starts moving up, in a positive direction.

(i)

If the initial velocity of the particle is

- 3 {ms}^{- 1}

, find the time at which the minimum displacement of the particle from the origin occurs, giving your answer in exact form.

(ii)

If T is the time in seconds when the displacement reaches its smallest value, show that

T = 2 \ln (1 - v_{o})

.

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11c

5 marks

(i)

Find a general expression for the displacement, in terms of

t

and

v_{o}

.

(ii)

Combine this general expression with the result from part (b)(ii) to find an expression for the minimum displacement of the particle in terms of

v_{o}

.

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11d

5 marks

Let $v (T - k)$ represent the particle’s velocity k seconds before the minimum displacement and $v (T + k)$ the particle’s velocity k seconds after the minimum displacement.

(i) Show that

v (T - k) = 1 - e^{\frac{k}{2}} .

(ii) Given that $v (T + k) = 1 - e^{- \frac{k}{2}},$ show that $v (T - k) + v (T + k) \geq 0 .$

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12a

5 marks

The diagram below shows the graph of $f (x) = \arctan (x), x \in ℝ .$ The graph has rotational symmetry of order 2 about the origin.

mi-q12a-ib-aa-hl-pp1-set-c-maths-dig

A different function, g, is described by g $(x) = - \arctan (x - 1), x \in ℝ .$

(i)

Describe the sequence of transformations that transforms

f (x)

to g

(x)

.

(ii)

Sketch the graph of g $(x)$ on the axes above.

(iii)

Using your answers to parts (i) and (ii) to help you, describe the relationship between

\int_{0}^{1} \arctan (x) d x

and

\int_{0}^{1} - \arctan (x - 1) d x .

.

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12b

6 marks

(i)

Prove that

\arctan p - \arctan q = \arctan (\frac{p - q}{1 + p q}) .

(ii) Show that

\arctan (\frac{1}{x^{2} - x + 1})

can be written as

\arctan (x) - \arctan (x - 1) .

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12c

7 marks

Using the results from parts (a) and (b), evaluate $\int_{0}^{1} \arctan (\frac{1}{x^{2} - x + 1}) d x,$ leaving your answer in exact form.

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Practice Paper 1 (DP IB Maths: AA HL)

Practice Paper Questions