Basic Limits & Continuity (DP IB Analysis & Approaches (AA): HL): Exam Questions

2 hours18 questions
1a
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2 marks

For each of the following, either show that the limit converges and find its value, or else explain why the limit diverges:

limx4 1x29 

1b
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2 marks

limx3 1x29

1c
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3 marks

limx3 x3x29

2a
2 marks

Evaluate the limit 

limx (13619x2)

justifying your answer by clear mathematical reasoning.

2b
3 marks

Show that the limit 

limx+ 3x25x+7x2 

converges, and find its value.  Be sure to show clear algebraic working.

3a
2 marks

A student has attempted to evaluate the limit 

limx+ (x3x) 

as follows: 

limx+(x3x)=(+)3(+)=(+)(+)=0 

Explain what is wrong with the student’s work.

3b
2 marks

Determine the correct evaluation of the limit, justifying your answer by clear mathematical reasoning.

3c
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2 marks

Use technology to help you sketch the graph of y=x3x, and show that the graph confirms your answer to part (b).

4a
3 marks

Consider the function  defined by

 f(x)=1x2 

Evaluate the limits

(i) limx0f(x)

(ii) limx0+f(x)

4b
3 marks

Evaluate the limits

(i) limxf(x) 

(ii) limx+f(x)

4c
2 marks

Use your results from parts (a) and (b) to write down the equations of any asymptotes on the graph of  y=f(x).

4d
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2 marks

Use technology to help you sketch the graph of y=f(x), and show that this confirms your results from parts (a), (b) and (c).

5a
3 marks

Consider the function g defined by 

g(x)=1x5 

Evaluate the limits

(i) limx5g(x)

(ii) limx5+g(x)

5b
3 marks

Evaluate the limits

(i) limxg(x) 

(ii) limx+g(x)

5c
2 marks

Use your results from parts (a) and (b) to write down the equations of any asymptotes on the graph of y=g(x).

5d
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2 marks

Use technology to help you sketch the graph of y=g(x), and show that this confirms your results from parts (a), (b) and (c).

6a
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3 marks

The function f is a piecewise function defined by

  f(x)={   x2  ,  x2x+3,  x>2 

Explain why f is not continuous at x=2.

6b
2 marks

A function g is defined for all x, and it is differentiable at all points x.

Explain why g is continuous at  x=7.

1a
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2 marks

For each of the following, either show that the limit converges and find its value, or else explain why the limit diverges:

limx2514x225

1b
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2 marks

limx5214x225

1c
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3 marks

limx522x54x225

2a
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3 marks

Evaluate the limit

 limx(5+(2x3)22x2) 

justifying your answer by clear mathematical reasoning.

2b
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4 marks

(i) Show that the limit

 limx+x2x+3x

   diverges.  Be sure to show clear algebraic working.

(ii) Determine any asymptotes on the graph of the curve with equation          

 y=x2x+3x

3a
2 marks

A student has attempted to evaluate the limit

limx+(x2+xx3)

as follows:

limx+(x2+xx3)=(+)2+(+)(+)3=++=1

Explain what is wrong with the student’s work.

3b
2 marks

Determine the correct evaluation of the limit, justifying your answer by clear mathematical reasoning.

3c
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2 marks

Use technology to help you sketch the graph of y=x2+xx3, and show that the graph confirms your answer to part (b).

4a
3 marks

Consider the function f defined by

f(x)=1(2x+6)2 

Evaluate the limits

(i) limx3f(x)

(ii) limx3+f(x)

4b
3 marks

Evaluate the limits

(i) limxf(x)

(ii) limx+f(x)

4c
2 marks

Use your results from parts (a) and (b) to write down the equations of any asymptotes on the graph of y=f(x).

4d
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2 marks

Use technology to help you sketch the graph of y=f(x),  and show that this confirms your results from parts (a), (b) and (c).

5a
3 marks

Consider the function g defined by

 g(x)=1x38+1

Evaluate the limits

(i) limx2g(x)

(ii) limx2+g(x)

5b
3 marks

Evaluate the limits

(i) limxg(x)

(ii) limx+g(x)

5c
2 marks

Use your results from parts (a) and (b) to write down the equations of any asymptotes on the graph of y=g(x).

5d
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2 marks

Use technology to help you sketch the graph of y=g(x),  and show that this confirms your results from parts (a), (b) and (c).

6a
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3 marks

The function f is a piecewise function defined by 

 f(x)={3x7,     x<3      1,x=3x28x+17,x>3

Explain why f is not continuous at x=3.

6b
3 marks

Give an example of a function g that is continuous for all values of x, but is not differentiable for all values of x.  Include a sketch of the graph of the function, identifying the point(s) where the function is not differentiable.

1a
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2 marks

For each of the following, either show that the limit converges and find its value, or else explain why the limit diverges:

limx0tan(xπ4)

1b
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2 marks

limx3π4tan(xπ4)

1c
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3 marks

limx3π4tan(xπ4)sec(xπ4)

2a
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3 marks

Evaluate the limit

 limx+cos(3x2)

justifying your answer by clear mathematical reasoning.

2b
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5 marks

(i) Show that the limit

 limx(2x3+6x2+12x2+tan(πx32x2+372x4x3)) 

diverges.  Be sure to show clear algebraic working.

 

(ii) Determine the asymptotic behaviour of the curve with equation

 y=2x3+6x2+12x2+tan(πx32x2+372x4x3)        

as x±.

3a
2 marks

A student has attempted to evaluate the limit

 limx(x2+x+14x2+x2) 

as follows:

limx(x2+x+14x2+x2)=()2+()+14()2+()2=(+)+()+14(+)+()2=0+1402=7

 

Explain what is wrong with the student’s work.

3b
2 marks

Determine the correct evaluation of the limit, justifying your answer by clear mathematical reasoning.

3c
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2 marks

Use technology to help you sketch the graph of y=x2x+14x2x2, and show that the graph confirms your answer to part (b).

4a
3 marks

Consider the function f defined by

f(x)=1(arctan x)2 

Evaluate the limits

(i) limx0f(x)

(ii) limx0+f(x)

 

4b
4 marks

Evaluate the limits

(i) limxf(x)

(ii) limx+f(x)

4c
2 marks

Use your results from parts (a) and (b) to write down the equations of any asymptotes on the graph of y=f(x).

4d
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2 marks

Use technology to help you sketch the graph of y=f(x),  and show that this confirms your results from parts (a), (b) and (c).

5a
3 marks

Consider the function g defined by

 g(x)=2x3x1x3+1

Evaluate the limits

(i) limx1g(x)

(ii) limx1+g(x)

5b
3 marks

Evaluate the limits

(i) limxg(x)

(ii) limx+g(x)

5c
3 marks

Write down the equations of any asymptotes on the graph of y=g(x).

5d
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2 marks

Use technology to help you sketch the graph of y=g(x),  and show that this confirms your results from parts (a), (b) and (c).

6a
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3 marks

The function f is a piecewise function defined by

f(x)={    103x,          x<2    x24x2,x=2|x22x4|,x>2

 Explain why f is not continuous at x=2.

6b
3 marks

Give an example of a function g that is continuous for all x,  but which is not differentiable at  x=3.  Include a sketch of the graph of the function, identifying all points where the function is not differentiable.

6c
2 marks

Write down a continuous function h for which limxh(x)  and limx+h(x)  both exist and are finite, but for which limxh(x)limx+h(x).