International A Level (IAL)MathsEdexcelPure 4Exam QuestionsBinomial ExpansionGeneral Binomial Expansion

General Binomial Expansion (Edexcel International A Level (IAL) Maths: Pure 4): Exam Questions

Exam code: YMA01

4 hours47 questions
Easy
Medium
Hard
Very Hard
1
Sme Calculator2 marks

Find, in ascending powers of x, the binomial expansion of

open parentheses 1 minus x close parentheses to the power of blank to the power of negative 1 end exponent end exponent

up to and including the term in x squared.

How did you do?

2a
Sme Calculator2 marks

Find the first three terms, in ascending powers of x, in the binomial expansion of

left parenthesis 1 plus x right parenthesis to the power of negative 2 end exponent

How did you do?

2b
Sme Calculator1 mark

State the values of x for which your expansion in part (a) is valid.

How did you do?

3a
Sme Calculator2 marks

Show that

square root of 4 minus 4 x end root equals 2 left parenthesis 1 minus x right parenthesis to the power of begin inline style 1 half end style end exponent

How did you do?

3b
Sme Calculator2 marks

Hence find, in ascending powers of x, the first three terms in the binomial expansion of

square root of 4 minus 4 x end root

How did you do?

3c
Sme Calculator2 marks

Using x equals 0.02, use your expansion from part (b) to find an approximation to  2 square root of 0.98 end root.

How did you do?

4
Sme Calculator4 marks

Find, in ascending powers of x, the binomial expansion of

left parenthesis 1 plus 2 x right parenthesis to the power of negative begin inline style 1 half end style end exponent

up to and including the term in x cubed.

How did you do?

5a
Sme Calculator4 marks

Find the first three terms, in ascending powers of x, in the binomial expansion of

left parenthesis 1 minus 1 half x right parenthesis to the power of begin inline style 1 third end style end exponent

How did you do?

5b
Sme Calculator1 mark

State the values of x for which your expansion in part (a) is valid.

How did you do?

6
Sme Calculator2 marks

Find the coefficient of the term in x squared in the binomial expansion of

left parenthesis 1 minus 3 x right parenthesis to the power of negative 3 end exponent

How did you do?

7
Sme Calculator2 marks

The function straight f left parenthesis x right parenthesis is given by

straight f left parenthesis x right parenthesis equals left parenthesis 1 minus p x right parenthesis to the power of negative 4 end exponent

where p is an integer.

Find the coefficient of the term in x cubed in the binomial expansion of  straight f left parenthesis x right parenthesis, in terms of p.

How did you do?

8a
Sme Calculator3 marks

Given that x is small such that x cubed and higher powers of x can be ignored show that

left parenthesis 1 minus 1 third x right parenthesis to the power of negative 2 end exponent almost equal to 1 plus 2 over 3 x plus 1 third x squared

How did you do?

8b
Sme Calculator2 marks

Using a suitable value of x in the result from part (a), find an approximation for the value of left parenthesis 0.94 right parenthesis to the power of negative 2 end exponent.

How did you do?

9
Sme Calculator5 marks

It is given that

straight f left parenthesis x right parenthesis equals square root of 1 plus a x end root space space space a n d space space space g left parenthesis x right parenthesis equals cube root of 1 minus a x end root

where a is a non-zero constant.

In their binomial expansions, the coefficient of the x squared term for straight f left parenthesis x right parenthesis is equal to the coefficient of the x term for g left parenthesis x right parenthesis.

Find the value of a.

How did you do?

10a
Sme Calculator3 marks

Show, as partial fractions, that

fraction numerator 5 minus x over denominator open parentheses 1 plus x close parentheses open parentheses 1 minus x close parentheses end fraction identical to fraction numerator 3 over denominator 1 plus x end fraction plus fraction numerator 2 over denominator 1 minus x end fraction

How did you do?

10b
Sme Calculator4 marks

Find the first three terms, in ascending powers of x, of the binomial expansion of

(i) 3 left parenthesis 1 plus x right parenthesis to the power of negative 1 end exponent comma

(ii) 2 left parenthesis 1 minus x right parenthesis to the power of negative 1 end exponent

How did you do?

10c
Sme Calculator2 marks

Hence show that the first three terms, in ascending powers of x, in the binomial expansion of

fraction numerator 5 minus x over denominator open parentheses 1 plus x close parentheses open parentheses 1 minus x close parentheses end fraction

are

5 minus x plus 5 x squared

How did you do?

10d
Sme Calculator1 mark

Write down the values of x for which this expansion converges.

How did you do?

11a
Sme Calculator3 marks

Find the first three terms in the binomial expansion of  open parentheses 1 minus x close parentheses to the power of negative 1 end exponent.

How did you do?

11b
Sme Calculator1 mark

Write down the values of x the expansion is valid for.

How did you do?

11c
Sme Calculator2 marks

The first three terms of the expansion are to be used in a computer program to estimate the value of  fraction numerator 1 over denominator 0.95 end fraction.

Choose an appropriate value of  x to use in the expansion and thus find the value the computer program will use to estimate  fraction numerator 1 over denominator 0.95 end fraction.

How did you do?

1
Sme Calculator2 marks

Find, in ascending powers of x, the binomial expansion of

1 over open parentheses 1 minus x close parentheses squared

up to and including the term in x cubed.

How did you do?

2a
Sme Calculator2 marks

Find the first three terms, in ascending powers of x, in the binomial expansion of

square root of 1 plus 2 x end root

How did you do?

2b
Sme Calculator1 mark

State the values of x for which your expansion in part (a) is valid.

How did you do?

2c
Sme Calculator1 mark

Using a suitable value of x, use your expansion from part (a) to estimate square root of 1.06 end root, giving your answer to 3 significant figures.

How did you do?

3
Sme Calculator3 marks

Find, in ascending powers of x, the binomial expansion of

1 over open parentheses 4 plus 8 x close parentheses squared

up to and including the term in x cubed.

How did you do?

4a
Sme Calculator3 marks

Use the binomial expansion to show that the first three terms in the expansion of  left parenthesis 1 plus 2 x right parenthesis to the power of negative 3 end exponent are  1 minus 6 x plus 24 x squared.

How did you do?

4b
Sme Calculator2 marks

Hence, or otherwise, find the expansion of  left parenthesis 1 plus x right parenthesis left parenthesis 1 plus 2 x right parenthesis to the power of negative 3 end exponent up to and including the term in x squared.

How did you do?

5a
Sme Calculator2 marks

The function straight f left parenthesis x right parenthesis is given by

f left parenthesis x right parenthesis equals square root of 4 minus s x end root

where s is an integer.

(i) Find the coefficient of the term in x in the binomial expansion of  straight f left parenthesis x right parenthesis, in terms of s.

(ii) Find the coefficient of the term in x squared in the binomial expansion of  straight f left parenthesis x right parenthesis, in terms of s.

How did you do?

5b
Sme Calculator2 marks

In the binomial expansion of straight f left parenthesis x right parenthesis comma space the coefficient of the term in x is equal to the coefficient of the term in x squared.

Find the value of s.

How did you do?

6a
Sme Calculator3 marks

The functions straight f left parenthesis x right parenthesis and g left parenthesis x right parenthesis are given as follows

f left parenthesis x right parenthesis equals open parentheses 1 minus 1 half x close parentheses to the power of 1 half end exponent space space space space space space space space g left parenthesis x right parenthesis equals left parenthesis 2 plus x right parenthesis to the power of negative 2 end exponent

(i) Expand straight f left parenthesis x right parenthesis, in ascending powers of x up to and including the term in x squared.

(ii) Find the values for x for which the expansion is valid.

How did you do?

6b
Sme Calculator3 marks

(i) Expand g left parenthesis x right parenthesis comma in ascending powers of x up to and including the term in x squared.

(ii) Find the values for x for which the expansion is valid.

How did you do?

6c
Sme Calculator2 marks

(i) Find the expansion of fraction numerator square root of 1 minus 1 half x end root over denominator open parentheses 2 plus x close parentheses squared end fraction in ascending powers of x, up to and including the term in x squared.

(ii) Find the values for x for which the expansion is valid.

How did you do?

7
Sme Calculator3 marks

In the expansion of  open parentheses 1 minus 1 fourth x close parentheses to the power of n, where n is a negative integer, the coefficient of the term in x squared is begin inline style 3 over 8 end style.

Find the value of n.

How did you do?

8a
Sme Calculator3 marks

Express fraction numerator 2 over denominator open parentheses 1 minus x close parentheses open parentheses 1 plus x close parentheses end fraction  in partial fractions.

How did you do?

8b
Sme Calculator2 marks

Use the binomial expansion to find the first three terms, in ascending powers of x, in each of  open parentheses 1 minus x close parentheses to the power of negative 1 end exponent and open parentheses 1 plus x close parentheses to the power of negative 1 end exponent

How did you do?

8c
Sme Calculator2 marks

Hence show that fraction numerator 2 over denominator open parentheses 1 minus x close parentheses open parentheses 1 plus x close parentheses end fraction almost equal to 2 plus 2 x squared

How did you do?

8d
Sme Calculator1 mark

Write down the values of x for which your expansion in part (c) converges.

How did you do?

9a
Sme Calculator3 marks

Given that x is small such that x cubed and higher powers of x can be ignored show that

open parentheses 1 minus 1 third x close parentheses to the power of negative 1 end exponent space open parentheses 2 minus x close parentheses to the power of negative 2 end exponent space almost equal to 1 fourth plus 1 third x plus 43 over 144 x squared

How did you do?

9b
Sme Calculator2 marks

For which values of x is the approximation in part (a) valid?

How did you do?

9c
Sme Calculator3 marks

(i) Use your calculator to find the exact fraction of open parentheses 1 minus begin inline style 1 third end style x close parentheses to the power of negative 1 end exponent open parentheses 2 minus x close parentheses to the power of negative 2 end exponent  when x equals 0.5

(ii) Use your calculator to find the fraction from the approximation 1 fourth plus 1 third x plus 43 over 144 x squared when x equals 0.5

(iii) Find the percentage error in the approximation, giving your answer to two decimal places.

How did you do?

10
Sme Calculator3 marks

 It is given that

straight f left parenthesis x right parenthesis equals square root of 9 plus p x end root      and       g left parenthesis x right parenthesis equals fourth root of 16 plus p x end root

In their binomial expansions, the coefficient of the x squared term for straight f open parentheses x close parentheses is equal to the coefficient of the x term for g left parenthesis x right parenthesis.

Find the value of p.

How did you do?

11a
Sme Calculator2 marks

Express fraction numerator 12 minus x over denominator open parentheses x plus 2 close parentheses open parentheses 3 minus x close parentheses end fraction  in partial fractions.

How did you do?

11b
Sme Calculator3 marks

Using binomial expansions, up to and including terms in x squared show that

fraction numerator 12 minus x over denominator open parentheses x plus 2 close parentheses open parentheses 3 minus x close parentheses end fraction almost equal to 2 minus 1 half x plus 5 over 12 x squared

How did you do?

11c
Sme Calculator2 marks

Explain why the approximation in part (b) is only valid for space vertical line x vertical line less than 2.

How did you do?

12a
Sme Calculator3 marks

Find the first three terms in the binomial expansion of  fraction numerator 1 over denominator 1 minus 1 half x. end fraction

How did you do?

12b
Sme Calculator1 mark

Show that the expansion is valid for open vertical bar x close vertical bar less than 2.

How did you do?

12c
Sme Calculator2 marks

The expansion is to be used in a computer program to estimate the value of  20 over 19.

Find the value of x to be used and check it meets the validity requirement from part (b).

How did you do?

12d
Sme Calculator2 marks

Hence find the value the computer program will use to estimate  20 over 19.

How did you do?

1
Sme Calculator2 marks

Find, in ascending powers of x, the binomial expansion of

1 over open parentheses 1 minus 2 x close parentheses cubed

up to and including the term in x cubed.

How did you do?

2a
Sme Calculator3 marks

Use the first three terms, in ascending powers of x in the binomial expansion of

open parentheses 1 plus 4 x close parentheses to the power of begin inline style 1 third end style end exponent

to estimate the value of cube root of 1.2 end root, giving your answer to three significant figures.

How did you do?

2b
Sme Calculator1 mark

Explain why your approximation in part (a) is valid.

How did you do?

3
Sme Calculator4 marks

Find, in ascending powers of x, the binomial expansion of

1 over open parentheses 4 plus x close parentheses cubed

up to and including the term in x cubed.

How did you do?

4a
Sme Calculator2 marks

Use the binomial expansion to expand open parentheses 1 minus begin inline style 1 half end style x close parentheses to the power of begin inline style 1 third end style end exponent  up to and including the term in x to the power of 2. end exponent

How did you do?

4b
Sme Calculator2 marks

Hence, or otherwise, expand  open parentheses 1 minus x close parentheses open parentheses 1 minus begin inline style 1 half end style x close parentheses to the power of begin inline style 1 third end style end exponent up to and including the term in x squared.

How did you do?

5
Sme Calculator3 marks

In the expansion of  1 over open parentheses 3 plus p x close parentheses cubed  the coefficient of the term in x squared is double the coefficient of the term in x cubed.  Find the value of  p.

How did you do?

6a
Sme Calculator2 marks

The functions straight f left parenthesis x right parenthesis and  straight g left parenthesis x right parenthesis are given as follows

straight f left parenthesis x right parenthesis equals open parentheses 4 plus 3 x close parentheses to the power of 1 half end exponent space space space space space space space space space space space space space space space space space straight g left parenthesis x right parenthesis equals open parentheses 9 minus 2 x close parentheses to the power of negative 1 half end exponent

Expand straight f left parenthesis x right parenthesis, in ascending powers of x up to and including the term in x squared.

How did you do?

6b
Sme Calculator2 marks

Expand straight g open parentheses x close parentheses, in ascending powers of x up to and including the term in x squared.

How did you do?

6c
Sme Calculator2 marks

Find the expansion of square root of fraction numerator 4 plus 3 x over denominator 9 minus 2 x end fraction end root  in ascending powers of x, up to and including the term in x squared.

How did you do?

6d
Sme Calculator2 marks

Find the values of x for which your expansion in part (c) is valid.

How did you do?

7
Sme Calculator3 marks

In the expansion of  open parentheses 1 minus begin inline style 4 over 3 end style x close parentheses to the power of n , where n is a real number, the coefficient of the term in x squared is begin inline style negative 16 over 81 end style.

Find the possible values of n.

How did you do?

8a
Sme Calculator3 marks

Express fraction numerator 4 plus 5 x minus x squared over denominator open parentheses 1 minus x close parentheses open parentheses 1 plus x close parentheses squared end fraction  in partial fractions.

How did you do?

8b
Sme Calculator3 marks

Use the binomial expansion to find the first three terms, in ascending powers of x, in each of open parentheses 1 minus x close parentheses to the power of negative 1 end exponent, open parentheses 1 plus x close parentheses to the power of negative 1 end exponent, and open parentheses 1 plus x close parentheses to the power of negative 2 end exponent.

How did you do?

8c
Sme Calculator2 marks

Hence express  fraction numerator 4 plus 5 x minus x squared over denominator open parentheses 1 minus x close parentheses open parentheses 1 plus x close parentheses squared end fraction as the first three terms of a binomial expansion in ascending powers of  x.

How did you do?

8d
Sme Calculator1 mark

Write down the values of x for which your expansion in part (c) converges.

How did you do?

9a
Sme Calculator3 marks

Given that x is small such that x cubed and higher powers of x can be ignored show that

left parenthesis 2 plus 3 x right parenthesis to the power of negative 1 end exponent left parenthesis 3 minus 2 x right parenthesis to the power of negative 2 end exponent almost equal to 1 over 18 minus 1 over 108 x plus 19 over 216 x squared

How did you do?

9b
Sme Calculator3 marks

Find the percentage error between your calculator answer and the approximation in part (a) when x equals 0.1, giving your answer to one decimal place.

How did you do?

9c
Sme Calculator2 marks

For which values of x is the approximation in part (a) valid?

How did you do?

10a
Sme Calculator3 marks

In the binomial expansion of  square root of 4 plus begin inline style p over q end style x end root   where p less than 0 less than q, the coefficient of the x squared term is equal to the coefficient of the x cubedterm.

Show that space p equals negative 8 q.

How did you do?

10b
Sme Calculator2 marks

Given further that p q equals negative 8 space find the values of p and q.

How did you do?

11a
Sme Calculator3 marks

Express fraction numerator 1 minus 7 x over denominator open parentheses x plus 2 close parentheses open parentheses 3 minus x close parentheses end fraction  in the form  fraction numerator A over denominator x plus 2 end fraction plus fraction numerator B over denominator 3 minus x end fraction, where A and B are integers to be found.

How did you do?

11b
Sme Calculator3 marks

Hence, or otherwise, find the binomial expansion of fraction numerator 1 minus 7 x over denominator open parentheses x plus 2 close parentheses open parentheses 3 minus x close parentheses end fraction, in ascending powers of x, up to and including the term in x squared.

How did you do?

11c
Sme Calculator2 marks

The expansion in part (b) is to be used to approximate the value of a fraction.

(i) If x equals 0.1, which fraction is being approximated?

(ii) Which fraction does the approximation give?

How did you do?

12a
Sme Calculator3 marks

Find the first four terms in the binomial expansion of  fraction numerator 1 over denominator 2 minus 3 x end fraction.

How did you do?

12b
Sme Calculator2 marks

Find the values of x for which the expansion is valid.

How did you do?

12c
Sme Calculator2 marks

The expansion is to be used in a computer program to estimate the value of begin inline style 5 over 7 end style.

Check that the expansion is valid for this purpose and use the first four terms of the expansion to estimate the value of 5 over 7.

How did you do?

12d
Sme Calculator2 marks

Find the percentage error the computer program will introduce by using the expansion as an approximation to  5 over 7

How did you do?

1
Sme Calculator2 marks

Find, in ascending powers of x, the binomial expansion of

1 over open parentheses 1 minus 1 third x close parentheses to the power of 4

up to and including the term in x cubed.

How did you do?

2a
Sme Calculator3 marks

Use the first three terms, in ascending powers of x, in the binomial expansion of

fraction numerator 1 over denominator square root of 1 minus 1 half x end root end fraction

to estimate the value of fraction numerator 1 over denominator square root of 0.95 end root end fraction, giving your answer to two decimal places.

How did you do?

2b
Sme Calculator1 mark

Explain why you would not be able to use your expansion to approximate fraction numerator 1 over denominator square root of 3 end fraction.

How did you do?

3
Sme Calculator3 marks

Find, in ascending powers of x, the binomial expansion of

1 over open parentheses 3 minus 2 x close parentheses to the power of 4

up to and including the term in x cubed.

How did you do?

4
Sme Calculator4 marks

Expand left parenthesis 1 minus begin inline style 1 half end style x right parenthesis left parenthesis 9 plus 3 x right parenthesis to the power of negative begin inline style 1 half end style end exponent up to and including the term in x squared.

How did you do?

5
Sme Calculator4 marks

In the expansion of   1 over open parentheses 8 plus 2 q x close parentheses to the power of 1 third end exponent,  the coefficient of the term in x squared is one-seventh of the coefficient of the term in x cubed.  Find the value of q.

How did you do?

6
Sme Calculator5 marks

The functions straight f open parentheses x close parentheses and straight g open parentheses x close parentheses are given as follows

straight f left parenthesis x right parenthesis equals 8 minus x space space space space space space space space space space space space space space straight g left parenthesis x right parenthesis equals 8 plus 2 x

Find the binomial expansion of   cube root of fraction numerator straight f open parentheses x close parentheses over denominator straight g open parentheses x close parentheses end fraction end root, in ascending powers of x, up to and including the term in x squared.  Also find the values of xfor which your expansion is valid.

How did you do?

7
Sme Calculator4 marks

In the expansion of  open parentheses 16 minus 2 x close parentheses to the power of n, where n is a real number, the coefficient of the term in x squared is 16 to the power of n cross times 5 over 2048.

Given that vertical line n vertical line less than 1 find the value of n.

How did you do?

8a
Sme Calculator3 marks

Express  fraction numerator 2 open parentheses 2 minus 5 x plus x squared close parentheses over denominator open parentheses x plus 2 close parentheses open parentheses 2 minus x close parentheses squared end fraction  in partial fractions.

How did you do?

8b
Sme Calculator5 marks

Express fraction numerator 2 open parentheses 2 minus 5 x plus x squared close parentheses over denominator open parentheses x plus 2 close parentheses open parentheses 2 minus x close parentheses squared end fraction  as the first three terms of a binomial expansion in ascending powers of x.

How did you do?

8c
Sme Calculator1 mark

Write down the values of x for which your expansion in part (b) converges.

How did you do?

9a
Sme Calculator4 marks

Given that x is small such that x cubed and higher powers of x can be ignored show that          

left parenthesis 4 minus 3 x right parenthesis to the power of negative 2 end exponent left parenthesis 2 minus x right parenthesis to the power of negative 3 end exponent almost equal to 1 over 128 plus 3 over 128 x plus 87 over 2048 x squared

How did you do?

9b
Sme Calculator3 marks

Find the percentage error between your calculator answer and the approximation in part (a) when x equals 0.2, giving your answer to one decimal place.

How did you do?

9c
Sme Calculator2 marks

For which values of x is the approximation in part (a) valid?

How did you do?

10
Sme Calculator4 marks

It is given that

straight f left parenthesis x right parenthesis equals square root of 4 plus a x end root        and              straight g left parenthesis x right parenthesis equals fourth root of 16 plus b x end root

The binomial expansions of  straight f left parenthesis x right parenthesis  and  straight g left parenthesis x right parenthesis have the following properties:

(i) The coefficient of the x cubed term in the expansion of straight f open parentheses x close parentheses is 72 times larger than the coefficient of the x squared term in the expansion of straight g open parentheses x close parentheses.

(ii) The coefficient of the x term in the expansion of straight f open parentheses x close parentheses is 24 times larger than the coefficient of the x term in the expansion of straight g open parentheses x close parentheses.

Find the values of a and b.

How did you do?

11a
Sme Calculator5 marks

Find the binomial expansion of fraction numerator 15 over denominator open parentheses x minus 4 close parentheses open parentheses 5 x minus 2 close parentheses to the power of apostrophe end fraction, in ascending powers of x, up to and including the term in x squared.

How did you do?

11b
Sme Calculator2 marks

Explain why the expansion found in part (a) cannot be used when x equals 0.6.

How did you do?

12
Sme Calculator6 marks

The binomial expansion of

fraction numerator 1 over denominator square root of 4 minus 2 x end root end fraction

is to be used in a computer program to estimate the reciprocal of square root of space 3.8 end root.

The computer program needs to be accurate to at least 5 significant figures when compared to the value produced by a scientific calculator.

Find the least number of terms from the expansion that are required for the computer program.  Justify that the expansion used is valid.

How did you do?