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Unit 1: Real And Complex Numbers
Explanation Of Exercise 1.4
Explanation Of Laws of Exponents/Indices
Laws of Exponents/Indices:
Laws of exponents or indices are important in many fields of mathematics.Recall Base, Exponent and value of Power
Consider an exponential form an here, 'a' is called the base and 'n' is called exponent or index i.e., read as a to the nth power. The result of an, where a ∈ R is called its value.
Apply the Laws of Exponents to Simplify Expressions with Real Exponents
The following laws of exponents are useful to simplify the expressions.
(i) Law of Product of Powers
- (a) If a, b ∈ R and x, y ∈ Z+
- Then, ax x ay = ax+y
- (a) a2 x a3 = a2+3 = a5
- (b) 3 x 35 = 31+5 x 36 = 729
(ii) Law of Power of Power
If a ∈ R and x, y ∈ Z+, then (ax)y = axy
Some examples based on this law are given below:
- (a) (52)4 = 52x4 = 58 = 390625
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