Laws of indices (WJEC GCSE Maths & Numeracy (Double Award): Foundation): Revision Note

Exam code: 3320

Laws of indices

What are the laws of indices?

  • Index laws are rules you can use when doing operations with powers

    • They work with both numbers and algebra

Law

Description

How it works

a1=a

Anything to the power of 1 is itself

61=6

am×an=am+n

To multiply indices with the same base, add their powers

43×42=(4×4×4)×(4×4)=45

am÷an=aman=amn

To divide indices with the same base, subtract their powers

75÷72=7×7×7×7×77×7=73 

(am)n=amn

To raise indices to a new power, multiply their powers

(143)2=(14×14×14)×(14×14×14)=146

(ab)n=anbn

To raise a product to a power, apply the power to both numbers, and multiply

(3×4)2=32×42

(ab)n=anbn

To raise a fraction to a power, apply the power to both the numerator and denominator

(34)2=3242=916

How do I deal with different bases?

  • Index laws only work with terms that have the same base

    • 23×52 cannot be simplified using index laws

  • Sometimes expressions involve different base values, but one is related to the other by a power

    • e.g. 25×43

  • You can use powers to rewrite one of the bases

    • 25×43=25×(22)3

    • This can then be simplified more easily, as the two bases are now the same

    • 25×(22)3=25×26=211

Worked Example

(a) Find the value of x when 610 × 6x = 62

Answer:

Using the law of indices am×an=am+n we can rewrite the left hand side

 610×6x=610+x

So the equation is now

610+x=62

Comparing both sides, the bases are the same, so we can say that

10+x=2

Subtract 10 from both sides

x=8

(b) Find the value of n when 5n÷54=56

Answer:

Using the law of indices am÷an=amn we can rewrite the left hand side

5n÷54=5n4

So the equation is now 

5n4=56

Comparing both sides, the bases are the same, so we can say that

n4=6

Add 4 to both sides

n=10

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