3. (a) Find the first 4 terms, in ascending powers of x, of the binomial expansion of (1 + ax)^{10}, where a is a non-zero constant - Edexcel - A-Level Maths Pure - Question 5 - 2008 - Paper 2

To find the first four terms of the binomial expansion of

$(1 + ax)^{10},$

we can apply the Binomial Theorem:

$(a + b)^n = \sum_{k=0}^{n} {n \choose k} a^{n-k} b^k$

Here,\n- $n = 10$, $a = 1$, and $b = ax$. Thus, we have:

1. For $k=0$: ${10 \choose 0} (1)^{10} (ax)^{0} = 1$

2. For $k=1$: ${10 \choose 1} (1)^{9} (ax)^{1} = 10(ax) = 10ax$

3. For $k=2$: ${10 \choose 2} (1)^{8} (ax)^{2} = 45a^2x^{2}$

4. For $k=3$: ${10 \choose 3} (1)^{7} (ax)^{3} = 120a^3x^{3}$

Combining these, the first four terms are:

$1 + 10ax + 45a^2x^2 + 120a^3x^3$