Simplify, Giving Solution with Positive Index 2^"4a". 2^("3a") .2^(-"A")

Question

Simplify, giving Solution with positive index

`2^"4a". 2^("3a") .2^(-"a")`

Sum

Solution

`2^("4a" + 3"a" - "a")`

`= 2^("7a" - "a") = 2^"6a"`

shaalaa.com

Laws of Exponents (Through Observing Patterns to Arrive at Generalisation.)

Is there an error in this question or solution?

Q 3.1 Q 3.09 Q 3.11

Chapter 5: Exponents (Including Laws of Exponents) - Exercise 5 (B)

APPEARS IN

Selina Concise Mathematics [English] Class 7 ICSE

Chapter 5 Exponents (Including Laws of Exponents)
Exercise 5 (B) | Q 3.1

RELATED QUESTIONS

Evaluate: 5⁴ × 5³ ÷ 5⁵

Evaluate: 5⁴ ÷ 5³ x 5⁵

Simplify, giving Solution with positive index

2b⁶. b³. 5b⁴

Simplify, giving Solution with positive index

- (3ab)² (-5a²bc⁴)²

Simplify, giving Solution with positive index

(4x²y³)³ ÷ (3x²y³)³

Simplify, giving Solution with positive index

`(1/("4ab"^2"c"))^2 div (3/(2"a"^2"bc"^2))^4`

Simplify, giving Solution with positive index

`((5"x"^7)^3 . (10"x"^2)^2)/(2"x"^6)^7 = (5^3 "x"^(7xx3) . 10^2 . "x"^(2xx2))/(2^7. "x"^(6xx7))`

Simplify, giving Solution with positive index

`((7 "p"^2 "q"^9 "r"^5)^2 (4 "pqr")^3)/(14 "p"^6 "q"^10 "r"^4)^2`

Evaluate: `(2^2)^0 + 2^-4 div 2^-6 + (1/2)^-3`

If m = -2 and n = 2; find the values of m² + n² - 2mn.

Simplify, Giving Solution with Positive Index 2^"4a". 2^("3a") .2^(-"A")

Advertisements

Advertisements

Question

Advertisements

Solution

APPEARS IN

RELATED QUESTIONS

Select a course

Simplify, Giving Solution with Positive Index 2^"4a". 2^("3a") .2^(-"A")

Advertisements

Advertisements

Question

Advertisements

SolutionShow Solution

APPEARS IN

RELATED QUESTIONS

Select a course

Solution