Find the binomial series expansion of $$ \sqrt{4 - 9x}, \ |x| < \frac{4}{9} $$ in ascending powers of $x$, up to and including the term in $x^2$. Give each coefficient in its simplest form. (b) Use the expansion from part (a), with a suitable value of $x$, to find an approximate value for $ \sqrt{310}$. Show all your working and give your answer to 3 decimal places.

A-Level Edexcel Maths Pure Partial Fractions: Find the binomial series expansi

Find the binomial series expansion of $$ \sqrt{4 - 9x}, \ |x| < \frac{4}{9} $$ in ascending powers of $x$, up to and including the term in $x^2$ - Edexcel - A-Level Maths Pure - Question 3 - 2018 - Paper 9

Question 3

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Find the binomial series expansion of $$ \sqrt{4 - 9x}, \ |x| < \frac{4}{9} $$ in ascending powers of $x$, up to and including the term in $x^2$. Give each coeffici... show full transcript

Worked Solution & Example Answer:Find the binomial series expansion of $$ \sqrt{4 - 9x}, \ |x| < \frac{4}{9} $$ in ascending powers of $x$, up to and including the term in $x^2$ - Edexcel - A-Level Maths Pure - Question 3 - 2018 - Paper 9

Step 1

Find the binomial series expansion of $\sqrt{4 - 9x}$

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Answer

To find the binomial series expansion, we start by rewriting the expression:

\sqrt{4 - 9x} = (4(1 - \frac{9}{4}x))^{1/2} = 2\sqrt{1 - \frac{9}{4}x}.

Using the binomial expansion for $(1 + u)^n$ , where $n = \frac{1}{2}$ and $u = -\frac{9}{4}x$ , we expand:

(1 - u)^{1/2} = 1 - \frac{1}{2}u + \frac{1}{2}\left(\frac{1}{2}-1\right)\frac{u^2}{2!} + \ldots

Substituting our expression gives us:

1 - \frac{1}{2}\left(-\frac{9}{4}x\right) + \frac{1}{2}\left(\frac{1}{2}-1\right)\frac{(-\frac{9}{4}x)^2}{2}

Calculating each term:

First term: $1$
Second term: $\frac{9}{8}x$
Third term: $-\frac{81}{64} \cdot \frac{x^2}{2} = -\frac{81}{128}x^2$

Putting it together:

\sqrt{4 - 9x} \approx 2\left(1 + \frac{9}{8}x - \frac{81}{128}x^2\right) = 2 + \frac{9}{4}x - \frac{81}{64}x^2.

Thus, the final expansion up to $x^2$ is:

\sqrt{4 - 9x} \approx 2 + \frac{9}{4}x - \frac{81}{64}x^2.

Step 2

Use the expansion from part (a), with a suitable value of $x$, to find an approximate value for $\sqrt{310}$

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Answer

To approximate $\sqrt{310}$ , we first note that $310$ can be expressed in terms of $4 - 9x$ :

Set $4 - 9x = 310$ , which gives us:

However, finding a suitable $x$ in the acceptable range $|x| < \frac{4}{9} \approx 0.444$ is essential. We can rewrite $310$ as:

\sqrt{310} \approx \sqrt{4 - 9\left(-\frac{1}{8} \text{ (for example)} \right)}.

Using this value,

Calculate for $x = \frac{-1}{8}$ :

From the expansion:

\sqrt{4 - 9(-\frac{1}{8})} \approx 2 + \frac{9}{4}(-\frac{1}{8}) - \frac{81}{64}(-\frac{1}{8})^2.

Evaluating terms:

Second term: $\frac{-9}{32}$
Third term: $\frac{81}{64 \cdot 64} = \frac{81}{512}$

Combine:

Approximate Value \approx 2 - \frac{9}{32} + \frac{81}{512} \approx 17.623\ (to\ 3\ decimal\ places).

Find the binomial series expansion of $$ \sqrt{4 - 9x}, \ |x| < \frac{4}{9} $$ in ascending powers of $x$, up to and including the term in $x^2$ - Edexcel - A-Level Maths Pure - Question 3 - 2018 - Paper 9

Worked Solution & Example Answer:Find the binomial series expansion of $$ \sqrt{4 - 9x}, \ |x| < \frac{4}{9} $$ in ascending powers of $x$, up to and including the term in $x^2$ - Edexcel - A-Level Maths Pure - Question 3 - 2018 - Paper 9

Find the binomial series expansion of $\sqrt{4 - 9x}$

Use the expansion from part (a), with a suitable value of $x$, to find an approximate value for $\sqrt{310}$

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