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Powers, Roots & Indices (CIE IGCSE Maths: Core)

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Jamie W

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Jamie W

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Powers & Roots

What are powers/indices?

  • Powers of a number is when that number is multiplied by itself repeatedly
    • 51 means 5
    • 52 means 5 × 5
    • 53 means 5 × 5 × 5
    • Therefore the powers of 5 are 5, 25, 125, etc
  • The big number on the bottom is sometimes called the base number
  • The small number that is raised is called the index or the exponent
  • Any non-zero number to the power of 0 is equal to 1
    • 50 = 1

What are roots?

  • Roots of a number are the opposite of powers
  • A square root of 25 is a number that when squared equals 25
    • The two square roots are 5 and -5 
    • Every positive number has two square roots
      • They will have the same digits but one is positive and one is negative
    • The notation square root of blank end root  refers to the positive square root of a number
      • square root of 25 equals 5
      • You can show both roots at once using the plus or minus symbol ±
      • Square roots of 25 are plus-or-minus square root of 25 equals plus-or-minus 5
    • The square root of a negative number is not a real number
    • The positive square root can be written as an index of 1 half so 25 to the power of 1 half end exponent equals 5
  • cube root of 125 is a number that when cubed equals 125
    • A cube root of 125 is 5
    • Every positive and negative number always has a cube root
    • The notation cube root of blank refers to the cube root of a number
      • cube root of 125 equals 5
    • The cube root can be written as an index of 1 third so 125 to the power of 1 third end exponent equals 5
  • A nth root of a number (n-th root of blank)is a number that when raised to the power n equals the original number
    • If n is even then they work the same way as square roots
      • There will be a positive and negative nth root
      • The notation n-th root of blank refers to the positive nth root of a number
    • If n is odd then they work the same way as cube
      • Every positive and negative number will have an nth root
    • The nth root can be written as an index of 1 over n
  • If you know your powers of numbers then you can use them to find roots of numbers
    • e.g. 2 to the power of 5 equals 32 means fifth root of 32 equals 2
      • You could write this using an index 32 to the power of 1 fifth end exponent equals 2
  • You can also estimate roots by finding the closest powers
    • e.g. 2 cubed equals 8 and 3 cubed equals 27 therefore 2 less than cube root of 20 less than 3

What are reciprocals?

  • The reciprocal of a number is the number that you multiply it by to get 1
    • The reciprocal of 2 is 1 half
    • The reciprocal of 0.25 or 1 fourth is 4
    • The reciprocal of 3 over 2 is 2 over 3
  • The reciprocal of a number can be written as a power with an index of -1
    • 5-1 means the reciprocal of 5
  • This idea can be extended to other negative indices
    • 5-2 means the reciprocal of 52

Laws of Indices

What are the laws of indices?

  • There are lots of very important laws (or rules)
  • It is important that you know and can apply these
  • Understanding the explanations will help you remember them
Law Description Why
a to the power of 1 equals a anything to the power 1 is itself 6 to the power of 1 equals 6
a to the power of m cross times a to the power of n equals a to the power of m plus n end exponent to multiply indices with the same base, add their powers 4 cubed cross times 4 squared
equals open parentheses 4 cross times 4 cross times 4 close parentheses cross times open parentheses 4 cross times 4 close parentheses
equals 4 to the power of 5
a to the power of m divided by a to the power of n equals a to the power of m over a to the power of n equals a to the power of m minus n end exponent to divide indices with the same base, subtract their powers 7 to the power of 5 divided by 7 cubed
equals fraction numerator 7 cross times 7 cross times up diagonal strike 7 cross times up diagonal strike 7 cross times up diagonal strike 7 over denominator up diagonal strike 7 cross times up diagonal strike 7 cross times up diagonal strike 7 end fraction
equals 7 squared
open parentheses a to the power of m close parentheses to the power of n equals a to the power of m n end exponent to raise indices to a new power, multiply their powers open parentheses 14 cubed close parentheses squared
equals open parentheses 14 cross times 14 cross times 14 close parentheses cross times open parentheses 14 cross times 14 cross times 14 close parentheses
equals 14 to the power of 6
a to the power of 0 equals 1 anything to the power 0 is 1 8 to the power of 0
equals 8 to the power of 2 minus 2 end exponent equals 8 squared divided by 8 squared
equals 8 squared over 8 squared equals 1
a to the power of negative n end exponent equals 1 over a to the power of n a negative power is "1 over" the positive power 11 to the power of negative 3 end exponent
equals 11 to the power of 0 minus 3 end exponent equals 11 to the power of 0 divided by 11 cubed
equals 11 to the power of 0 over 11 cubed equals 1 over 11 cubed
a to the power of 1 over n end exponent equals n-th root of a a power of an nth is an nth root open parentheses 5 to the power of 1 half end exponent close parentheses squared equals 5 to the power of 1 half cross times 2 end exponent equals 5 to the power of 1 equals 5
so space space space 5 to the power of 1 half end exponent equals square root of 5
open parentheses a over b close parentheses to the power of n equals a to the power of n over b to the power of n a power outside a fraction applies to both the numerator and the denominator open parentheses 5 over 6 close parentheses to the power of 3 space end exponent
equals 5 over 6 cross times 5 over 6 cross times 5 over 6
equals 5 cubed over 6 cubed
open parentheses a over b close parentheses to the power of negative n end exponent equals open parentheses b over a close parentheses to the power of n equals b to the power of n over a to the power of n flipping the fraction inside changes a negative power into a positive power open parentheses 5 over 6 close parentheses to the power of negative 2 end exponent equals 1 over open parentheses 5 over 6 close parentheses squared equals 1 divided by open parentheses 5 over 6 close parentheses squared equals 1 divided by 5 squared over 6 squared
equals 1 cross times 6 squared over 5 squared equals 6 squared over 5 squared equals open parentheses 6 over 5 close parentheses squared

How do I deal with different bases?

  • Sometimes expressions involve different base values
  • You can use index laws to change the base of a term to simplify an expression involving terms with different bases
    • For example 9 to the power of 4 equals left parenthesis 3 squared right parenthesis to the power of 4 equals 3 to the power of 2 cross times 4 end exponent equals 3 to the power of 8
    • Using the above can then help with problems like 9 to the power of 4 divided by 3 to the power of 7 equals 3 to the power of 8 divided by 3 to the power of 7 equals 3 to the power of 8 minus 7 end exponent equals 3 to the power of 1 equals space 3
  • Index laws only work with terms that have the same base, so something like 23 × 52 cannot be simplified using index laws

Worked example

(a)
Find the value of x when 6 to the power of 10 space cross times space 6 to the power of x space equals space 6 squared
 
Using the law of indices a to the power of m cross times a to the power of n equals a to the power of m plus n end exponent we can rewrite the left hand side
 
6 to the power of 10 cross times 6 to the power of x equals 6 to the power of 10 plus x end exponent
So the equation is now
 
6 to the power of 10 plus x end exponent equals 6 squared
 
Comparing both sides, the bases are the same, so we can say that
 
10 plus x equals 2
Subtract 10 from both sides
bold italic x bold equals bold minus bold 8
 
(b)
Find the value of n when 5 to the power of n divided by 5 to the power of 4 equals 5 to the power of 6
 
Using the law of indices a to the power of m divided by a to the power of n equals a to the power of m minus n end exponent we can rewrite the left hand side
 
5 to the power of n divided by 5 to the power of 4 equals 5 to the power of n minus 4 end exponent
So the equation is now 
5 to the power of n minus 4 end exponent equals 5 to the power of 6
 
Comparing both sides, the bases are the same, so we can say that
 
n minus 4 equals 6
Add 4 to both sides
bold italic n bold equals bold 10
 
(c)
Without using a calculator, find the value of 2 to the power of negative 4 end exponent
 
Using the law of indices open parentheses a to the power of m close parentheses to the power of n equals a to the power of m n end exponent we can rewrite the expression
 
2 to the power of negative 4 end exponent equals open parentheses 2 to the power of 4 close parentheses to the power of negative 1 end exponent
 
2 to the power of 4 equals 2 cross times 2 cross times 2 cross times 2 equals 16 so we can rewrite the expression
 
open parentheses 2 to the power of 4 close parentheses to the power of negative 1 end exponent equals 16 to the power of negative 1 end exponent
 
A power of -1, means the reciprocal (1 divided by the number)
16 to the power of negative 1 end exponent equals 1 over 16
bold 1 over bold 16

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Jamie W

Author: Jamie W

Expertise: Maths

Jamie graduated in 2014 from the University of Bristol with a degree in Electronic and Communications Engineering. He has worked as a teacher for 8 years, in secondary schools and in further education; teaching GCSE and A Level. He is passionate about helping students fulfil their potential through easy-to-use resources and high-quality questions and solutions.