Difference between revisions of "Laws of Exponents for Real Numbers"

Revision as of 09:51, 29 April 2024

The laws of exponents simplify the multiplication and division operations and help to solve the problems easily. In this article, we will be knowing the six important laws of exponents.

Laws of Exponents

Let a > 0 be a real number and p and q be rational numbers. Then, we have (i) a p . a q = a p+q (ii) (a p ) q = a pq (iii) p p q q a a a − = (iv) a pb p = (ab) p

Let $a>0$ be a real number and $p$ & $q$ be rational numbers. Then we have

$a^{p}\times a^{q}=a^{p+q}$
$(a^{p})^{q}=a^{pq}$
${\frac {a^{p}}{a^{q}}}=a^{p-q}$

@@ Line 1: / Line 1: @@
 The laws of exponents simplify the multiplication and division operations and help to solve the problems easily. In this article, we will be knowing the six important laws of exponents.
+== Laws of Exponents ==
+Let a > 0 be a real number and p and q be rational numbers. Then, we have (i) a p . a q = a p+q (ii) (a p ) q = a pq (iii) p p q q a a a − = (iv) a pb p = (ab) p
+Let <math>a >0</math> be a real number and <math>p</math> & <math>q</math> be rational numbers. Then we have
+* <math>a^p \times a^q=a^{p+q}</math>
+* <math>(a^p)^q=a^{pq}</math>
+* <math>\frac{a^p}{a^q}=a^{p-q}</math>

Difference between revisions of "Laws of Exponents for Real Numbers"

Revision as of 09:51, 29 April 2024

Laws of Exponents

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