Advertisements
Advertisements
प्रश्न
Determine if, 3 is a root of the equation given below:
`sqrt(x^2-4x+3)+sqrt(x^2-9)=sqrt(4x^2-14x+16)`
उत्तर
Given to check whether 3 is a root of the equation
`sqrt(x^2-4x+3)+sqrt(x^2-9)=sqrt(4x^2-14x+16)`
Here LHS = `sqrt(x^2-4x+3)+sqrt(x^2-9)` and RHS = `sqrt(4x^2-14x+16)`
Substitute x = 3 in LHS
`rArrsqrt(3^2-4(3)+3)+sqrt(3^2-9)`
`rArrsqrt(9-18+3)+sqrt(9-9)`
`rArrsqrt0+sqrt0`
⇒ 0
∴ LHS = 0
Similarly, substitute x = 3 in RHS.
`rArrsqrt(4(3)^2)-14(3)+16`
`rArrsqrt(4xx9-42+16)`
`rArrsqrt(36-42+16)`
`rArrsqrt(52-42)`
`rArrsqrt10`
∴ RHS `=sqrt10`
Now, we can observe that
LHS ≠ RHS
∴ x = 3 is not a solution or root for the equation
APPEARS IN
संबंधित प्रश्न
Write the quadratic equation whose roots are ‒2 and ‒3.
Check whether the following is quadratic equation or not.
`x^2 - 2x - sqrtx - 5 = 0`
Check whether the following is quadratic equation or not.
3x2 - 5x + 9 = x2 - 7x + 3
In the following, determine whether the given values are solutions of the given equation or not:
a2x2 - 3abx + 2b2 = 0, `x=a/b`, `x=b/a`
If x = 2/3 and x = −3 are the roots of the equation ax2 + 7x + b = 0, find the values of aand b.
Solve the equation `2x - 1/x = 7`. Write your answer correct to two decimal places.
`x^2+6x+5=0`
A fast train takes 3 hours less than a slow train for a journey of 600kms. If the speed of the slow train is 1 Okm/ hr less than the fast train, find the speed of the fast train.
If 3 and –3 are the solutions of equation ax2 + bx – 9 = 0. Find the values of a and b.
In each of the following find the values of k of which the given value is a solution of the given equation:
`"k"x^2 + sqrt(2)x- 4 = 0; x = sqrt(2)`
