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This topic is relevant for:
Here we will learn about brackets with indices.
There are also laws of indices worksheets based on Edexcel, AQA and OCR exam questions, along with further guidance on where to go next if you’re still stuck.
Brackets with indices are where we have a term inside a bracket with an index (or power) outside of the bracket.
To do this we can raise everything inside the bracket to the power.
E.g.
We could also have used the multiplication law of indices.
However, a quicker method would be to multiply the indices:
In general when there is a term inside a bracket with an index (or power) outside of the bracket multiply the powers.
Brackets with indices is one of the laws of indices.
In order to work out brackets with indices:
Get your free brackets with indices worksheet of 20+ questions and answers. Includes reasoning and applied questions.
DOWNLOAD FREEGet your free brackets with indices worksheet of 20+ questions and answers. Includes reasoning and applied questions.
DOWNLOAD FREEBrackets with indices is part of our series of lessons to support revision on laws of indices. You may find it helpful to start with the main laws of indices lesson for a summary of what to expect, or use the step by step guides below for further detail on individual topics. Other lessons in this series include:
Write as a single power of
It is quicker to multiply the indices (powers) together.
2Make sure you have considered the coefficient
There is no coefficient to consider.
3Write the final answer
The question asked for the answer to be as a single power so the final answer is:
Write as a single power of
Raise the term inside the brackets by the power outside the brackets
It is quicker to multiply the indices (powers) together:
Make sure you have considered the coefficient
There is no coefficient to consider.
Write the final answer
The question asked for the answer to be as a single power so the final answer is:
Write as a single power:
Raise the term inside the brackets by the power outside the brackets
It is quicker to multiply the indices (powers) together:
Make sure you have considered the coefficient
The coefficient is
Write the final answer
The question asked for the answer to be as a single power so the final answer is:
Write as a single power:
Raise the term inside the brackets by the power outside the brackets
It is quicker to multiply the indices (powers) together.
Make sure you have considered the coefficient
The coefficient is
Write the final answer
The question asked for the answer to be as a single power so the final answer is:
Simplify:
Raise the term inside the brackets by the power outside the brackets
You can split the term inside the bracket into the coefficient and the base with its index (power).
The base and its index is:
This is being raised to the power
It is quicker to multiply the indices (powers) together:
Make sure you have considered the coefficient
The coefficient is
Altogether it would be:
Write the final answer
The question asked for the answer to be as a single power so the final answer is:
Simplify:
Raise the term inside the brackets by the power outside the brackets
You can split the term inside the bracket into the coefficient and the base with its index (power).
The base and its index is:
This is being raised to the power
It is quicker to multiply the indices (powers) together:
Make sure you have considered the coefficient
The coefficient is
Altogether it would be:
Write the final answer
The question asked for the answer to be as a single power so the final answer is:
You do not need a multiplication sign between the coefficient and the algebraic letter.
So final answer would be:
It is a common error to forget to raise the coefficient to the power outside of the fraction. In the example below, it is easy to forget to square the coefficient
1. Write as a number to a single power: (2^3)^4
2. Write as a number to a single power: (7^2)^3
3. Write as a single power: (x^4)^2
4. Write as a single power: (h^9)^7
5. Simplify: (2d^3)^2
6. Simplify: (5e^4)^3
1. Simplify (3p^3 q^4)^2
(2 marks)
for 2 of 3 terms correct
(1)
9p^6 q^8
for correct final answer
(1)
2. Simplify (2n^2 m^5)^3
(2 marks)
for 2 of 3 terms correct
(1)
8n^6 m^{15}
for correct final answer
(1)
3. Simplify (7xy^4)^2
(2 marks)
for 2 of 3 terms correct
(1)
49x^2 y^8
for correct final answer
(1)
You have now learned how to:
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