If 9^n*3^2*3^n-27^n/3^3m*2^3 = 1/27, prove that m-n=1 | Easiest way to solve properties of exponents

If 9^n*3^2*3^n-27^n/3^3m*2^3 = 1/27, prove that m-n=1 | Easiest way to solve properties of exponents

CLASS-09 If (9)^n×(3)^2 ×(3^-n/2)^2-(27)^n/(3^3m×2^3) =1/729, prove m-n=2See more

CLASS-09 If (9)^n×(3)^2 ×(3^-n/2)^2-(27)^n/(3^3m×2^3) =1/729, prove m-n=2

If (9^n×3^2×(3^(-n/2) )^(-2)-(27)^n)/(3^3m×2^3 )=1/27 prove that m-n=1See more

If (9^n×3^2×(3^(-n/2) )^(-2)-(27)^n)/(3^3m×2^3 )=1/27 prove that m-n=1

If [9^n×3²×[3^(-n/2)]^(-2)-(27)^n]/[3^(3m)×2³]=1/27. prove that m-n=1||Number System||(ch-1,class-9)See more

If [9^n×3²×[3^(-n/2)]^(-2)-(27)^n]/[3^(3m)×2³]=1/27. prove that m-n=1||Number System||(ch-1,class-9)

[9^n × 3^2 × ( 3^-n/2)^-2 - ( 27)^n] / 3^3m×2^3 = 1/27, prove that m - n = 1,See more

[9^n × 3^2 × ( 3^-n/2)^-2 - ( 27)^n] / 3^3m×2^3 = 1/27, prove that m - n = 1,

If \n(9^n*3^2*(3^(-n/2))^(-2)-(27)^n)/(3^(3m)*2^3)=1/(27),\n\nProve that m-n=1. | 9 | EXPONENTS ...See more

If \n(9^n*3^2*(3^(-n/2))^(-2)-(27)^n)/(3^(3m)*2^3)=1/(27),\n\nProve that m-n=1. | 9 | EXPONENTS ...

CLASS-09 REAL NUMBERS BOARD 2012.If (9^(n+1)×(3^((-n)/2) )^(-2)-27^n)/(3^m×2)^3 =1/729, prove m-n=2See more

CLASS-09 REAL NUMBERS BOARD 2012.If (9^(n+1)×(3^((-n)/2) )^(-2)-27^n)/(3^m×2)^3 =1/729, prove m-n=2

if 9^n*3^2*3^n-27^n/3^3m*2^3=1/27 prove that m-n=1| RD Sharma class 9 maths chapter 2 Example 6See more

if 9^n*3^2*3^n-27^n/3^3m*2^3=1/27 prove that m-n=1| RD Sharma class 9 maths chapter 2 Example 6

If `(9^n\ xx\ 3^2\ xx\ (3^(-n/2))^(-2)-\ 27^n)/(3^(3m)\ xx\ 2^3)=1/(27)` , prove that `m-n=1`See more

If `(9^n\ xx\ 3^2\ xx\ (3^(-n/2))^(-2)-\ 27^n)/(3^(3m)\ xx\ 2^3)=1/(27)` , prove that `m-n=1`

If (9^n X 3^(2 ) X 3^n-27^n)/(3^3m X 2^3 )=1/27. Prove that m-n=1See more

If (9^n X 3^(2 ) X 3^n-27^n)/(3^3m X 2^3 )=1/27. Prove that m-n=1

News