Exam-Style Problems
โฌ Back to SubchapterNov 2023 p33 q9
Let \(f(x) = \frac{17x^2 - 7x + 16}{(2 + 3x^2)(2 - x)}\).
(a) Express \(f(x)\) in partial fractions.
(b) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^3\).
(c) State the set of values of \(x\) for which the expansion in (b) is valid. Give your answer in an exact form.
June 2019 p31 q8
Let \(f(x) = \frac{16 - 17x}{(2 + x)(3 - x)^2}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Feb/Mar 2019 p32 q8
Let \(f(x) = \frac{12 + 12x - 4x^2}{(2+x)(3-2x)}\).
(i) Express \(f(x)\) in partial fractions. [5]
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\). [5]
Nov 2018 p32 q8
Let \(f(x) = \frac{7x^2 - 15x + 8}{(1 - 2x)(2 - x)^2}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2018 p32 q9
Let \(f(x) = \frac{x - 4x^2}{(3-x)(2+x^2)}\).
(i) Express \(f(x)\) in the form \(\frac{A}{3-x} + \frac{Bx+C}{2+x^2}\).
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^3\).
June 2018 p31 q9
Let \(f(x) = \frac{12x^2 + 4x - 1}{(x-1)(3x+2)}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Nov 2017 p32 q8
Let \(f(x) = \frac{8x^2 + 9x + 8}{(1-x)(2x+3)^2}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2017 p32 q8
Let \(f(x) = \frac{5x^2 - 7x + 4}{(3x + 2)(x^2 + 5)}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Feb/Mar 2017 p32 q9
Let \(f(x) = \frac{x(6-x)}{(2+x)(4+x^2)}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Nov 2016 p33 q8
Let \(f(x) = \frac{3x^2 + x + 6}{(x+2)(x^2+4)}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2016 p33 q10
Let \(f(x) = \frac{10x - 2x^2}{(x+3)(x-1)^2}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Nov 2023 p31 q10
Let \(f(x) = \frac{24x + 13}{(1 - 2x)(2 + x)^2}\).
(a) Express \(f(x)\) in partial fractions.
(b) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
(c) State the set of values of \(x\) for which the expansion in (b) is valid.
June 2016 p31 q8
Let \(f(x) = \frac{4x^2 + 12}{(x+1)(x-3)^2}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2015 p32 q8
Let \(f(x) = \frac{5x^2 + x + 6}{(3 - 2x)(x^2 + 4)}\).
(i) Express \(f(x)\) in partial fractions. [5]
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\). [5]
Nov 2014 p31 q9
Let \(f(x) = \frac{x^2 - 8x + 9}{(1-x)(2-x)^2}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2014 p31 q9
(i) Express \(\frac{4 + 12x + x^2}{(3-x)(1+2x)^2}\) in partial fractions.
(ii) Hence obtain the expansion of \(\frac{4 + 12x + x^2}{(3-x)(1+2x)^2}\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Nov 2013 p33 q8
(i) Express \(\frac{7x^2 + 8}{(1+x)^2(2-3x)}\) in partial fractions.
(ii) Hence expand \(\frac{7x^2 + 8}{(1+x)^2(2-3x)}\) in ascending powers of \(x\) up to and including the term in \(x^2\), simplifying the coefficients.
Nov 2013 p31 q7
Let \(f(x) = \frac{2x^2 - 7x - 1}{(x-2)(x^2+3)}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Nov 2012 p33 q9
(i) Express \(\frac{9 - 7x + 8x^2}{(3-x)(1+x^2)}\) in partial fractions.
(ii) Hence obtain the expansion of \(\frac{9 - 7x + 8x^2}{(3-x)(1+x^2)}\) in ascending powers of \(x\), up to and including the term in \(x^3\).
June 2011 p32 q8
(i) Express \(\frac{5x - x^2}{(1+x)(2+x^2)}\) in partial fractions.
(ii) Hence obtain the expansion of \(\frac{5x - x^2}{(1+x)(2+x^2)}\) in ascending powers of \(x\), up to and including the term in \(x^3\).
Nov 2010 p31 q8
Let \(f(x) = \frac{3x}{(1+x)(1+2x^2)}\).
(i) Express \(f(x)\) in partial fractions. [5]
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^3\). [5]
June 2010 p33 q9
(i) Express \(\frac{4 + 5x - x^2}{(1 - 2x)(2 + x)^2}\) in partial fractions.
(ii) Hence obtain the expansion of \(\frac{4 + 5x - x^2}{(1 - 2x)(2 + x)^2}\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2023 p33 q10
Let \(f(x) = \frac{21 - 8x - 2x^2}{(1 + 2x)(3 - x)^2}\).
(a) Express \(f(x)\) in partial fractions.
(b) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Nov 2009 p32 q8
(i) Express \(\frac{1+x}{(1-x)(2+x^2)}\) in partial fractions.
(ii) Hence obtain the expansion of \(\frac{1+x}{(1-x)(2+x^2)}\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Nov 2009 p31 q8
(i) Express \(\frac{5x + 3}{(x + 1)^2(3x + 2)}\) in partial fractions.
(ii) Hence obtain the expansion of \(\frac{5x + 3}{(x + 1)^2(3x + 2)}\) in ascending powers of \(x\), up to and including the term in \(x^2\), simplifying the coefficients.
Nov 2007 p3 q9
(i) Express \(\frac{2 - x + 8x^2}{(1-x)(1+2x)(2+x)}\) in partial fractions.
(ii) Hence obtain the expansion of \(\frac{2 - x + 8x^2}{(1-x)(1+2x)(2+x)}\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2006 p3 q9
(i) Express \(\frac{10}{(2-x)(1+x^2)}\) in partial fractions.
(ii) Hence, given that \(|x| < 1\), obtain the expansion of \(\frac{10}{(2-x)(1+x^2)}\) in ascending powers of \(x\), up to and including the term in \(x^3\), simplifying the coefficients.
Nov 2005 p3 q9
(i) Express \(\frac{3x^2 + x}{(x+2)(x^2+1)}\) in partial fractions.
(ii) Hence obtain the expansion of \(\frac{3x^2 + x}{(x+2)(x^2+1)}\) in ascending powers of \(x\), up to and including the term in \(x^3\).
June 2004 p3 q9
Let \(f(x) = \frac{x^2 + 7x - 6}{(x-1)(x-2)(x+1)}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Show that, when \(x\) is sufficiently small for \(x^4\) and higher powers to be neglected,
\(f(x) = -3 + 2x - \frac{3}{2}x^2 + \frac{11}{4}x^3\).
June 2003 p3 q6
Let \(f(x) = \frac{9x^2 + 4}{(2x + 1)(x - 2)^2}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Show that, when \(x\) is sufficiently small for \(x^3\) and higher powers to be neglected, \(f(x) = 1 - x + 5x^2\).
Nov 2002 p3 q6
Let \(f(x) = \frac{6 + 7x}{(2-x)(1+x^2)}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Show that, when \(x\) is sufficiently small for \(x^4\) and higher powers to be neglected,
\(f(x) = 3 + 5x - \frac{1}{2}x^2 - \frac{15}{4}x^3\).
Nov 2022 p31 q10
Let \(f(x) = \frac{2x^2 + 7x + 8}{(1+x)(2+x)^2}\).
(a) Express \(f(x)\) in partial fractions.
(b) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2022 p33 q7
Let \(f(x) = \frac{5x^2 + 8x - 3}{(x-2)(2x^2 + 3)}\).
(a) Express \(f(x)\) in partial fractions.
(b) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2021 p32 q9
Let \(f(x) = \frac{14 - 3x + 2x^2}{(2 + x)(3 + x^2)}\).
(a) Express \(f(x)\) in partial fractions.
(b) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
Feb/Mar 2020 p32 q9
Let \(f(x) = \frac{2 + 11x - 10x^2}{(1 + 2x)(1 - 2x)(2 + x)}\).
(a) Express \(f(x)\) in partial fractions. [5]
(b) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\). [5]
Nov 2020 p31 q9
Let \(f(x) = \frac{8 + 5x + 12x^2}{(1-x)(2+3x)^2}\).
(a) Express \(f(x)\) in partial fractions.
(b) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\), up to and including the term in \(x^2\).
June 2019 p33 q9
Let \(f(x) = \frac{2x(5-x)}{(3+x)(1-x)^2}\).
(i) Express \(f(x)\) in partial fractions.
(ii) Hence obtain the expansion of \(f(x)\) in ascending powers of \(x\) up to and including the term in \(x^3\).
