Exercise 3CP1^
3
ExERCISE 3C 1 Write out the following binomial expansions.
(i) (x + 1)^4 (ii) (1 + x)^7 (iii) (x + 2)^5
(iv) (2x + 1)^6 (v) (2x − 3)^4 (vi) (2x + 3 y)^3(vii) (^) x
()−x
(^23) (viii) (^) x
x
()+^22
4
(ix) 32 25
()x −x2 Use a non-calculator method to calculate the following binomial coefficients.
Check your answers using your calculator’s shortest method.(i) 4
2
(ii) 6
2
(iii) 6
3
(iv) 6
4
(v) 6
0
(vi) 12
9
3 In these expansions, find the coefficient of these terms.(i) x^5 in (1 + x)^8 (ii) x^4 in (1 − x)^10 (iii) x^6 in (1 + 3 x)^12(iv) x^7 in (1 − 2 x)^15 (v) x^2 in x
x2210
()+^
4 (i) Simplify (1 + x)^3 − (1 − x)^3.
(ii) Show that a^3 − b^3 = (a − b)(a^2 + ab + b^2 ).
(iii) Substitute a = 1 + x and b = 1 − x in the result in part (ii) and show that
your answer is the same as that for part (i).
5 Find the first three terms, in descending powers of x, in the expansion
of 2 24
x
x()−.
6 Find the first three terms, in ascending powers of x, in the expansion (2 + kx)^6.
7 (i) Find the first three terms, in ascending powers of x, in the expansion
(1 − 2 x)^6.
(ii) Hence find the coefficients of x and x^2 in the expansion of (4 − x)(2 − 4 x)^6.
8 (i) Find the first three terms, in descending powers of x, in the expansion(^42)
6
x k
x
()−.
(ii) Given that the value of the term in the expansion which is independent of
x is 240, find possible values of k.
9 (i) Find the first three terms, in descending powers of x, in the expansion of(^) x
x
2
16
()−.
(ii) Find the coefficient of x^3 in the expansion of (^) x
x
2