Solve the equation 3^(x+1)C(2)+.^2P(1)x=...

Solve the equation `3^(x+1)C_(2)+.^2P_(1)x=4^(x)P_(2),x in N`.

Text Solution

Verified by Experts

The correct Answer is:

`x=3`

We have, `3^(x+1)C_(2)+P_(2)*x=4^(x)A_(2)`
`hArr(3(x+1)x)/(1*2)+2!x=4*x(x-1)`
`hArr3x^(2)+3x+4x=8x^(2)-8x`
`hArr5x^(2)_15x=0`
`hArr 5x(x-3)=0`
`thereforexne0` `[because x in N]`
Hence, x=3 is the solution of the given equation.

Similar Questions

Explore conceptually related problems

Solve the equation 5^(x^(2)+3x+2)=1

Solve the equation x^(2)+(x/(x-1))^(2)=8

Solve the equation 2^(|x+1|)-2^(x)=|2^(x)-1|+1

Solve the equation (12x-1)(6x-1)(4x-1)(3x-1)=5

Solve the equation x/2+((3x-1))/6=1-x/2

Solve the equation |x/(x-1)|+|x|=x^2/|x-1|

Solve the equation sqrt((6-4x-x^(2)))=x+4

Solve the equation tan^(-1) ((x-1)/(x-2))+tan^(-1)((x+1)/(x+2))=pi/4

Solve the equation x((3-x)/(x+1))(x+(3-x)/(x+1))=2

Solve the equation (x+2)(x+3)(x+8)xx(x+12)=4x^2dot

Solve the equation `3^(x+1)C_(2)+.^2P_(1)x=4^(x)P_(2),x in N`.

Text Solution

Similar Questions

Recommended Questions