Advertisements
Advertisements
प्रश्न
Find the value of a and b for which `x=3/4`and `x =-2` are the roots of the equation `ax^2+bx-6=0`
उत्तर
It is given that `3/4` is a root of ax^2+bx-6=0; therefore, we have:
`axx(3/4)^2+bxx3/4-6=0`
`⇒(9a)/16+(3b)/4=6`
`⇒ (9a+12b)/16=6`
`⇒ 9a+12b-96=0`
`⇒3a+4b=32` ........(i)
Again, (-2) is a root of ax^2+bx-6=0; therefore, we have:
`axx(-2)^2+bxx(-2)-6=0`
`⇒ 4a-2b=6`
`⇒2a-b=3` ..................(2)
On multiplying (ii) by 4 and adding the result with (i), we get:
`⇒3a+4b+8a-4b=32+12`
`⇒11a=44`
`⇒a=4`
Putting the value of a in (ii), we get:
`2xx4-b=3`
`⇒8-b=3 `
`⇒ b=5`
Hence, the required values of a and b are 4 and 5, respectively.
APPEARS IN
संबंधित प्रश्न
If the roots of the equation (a2 + b2) x2 – 2(ac + bd) x + (c2 + d2) = 0 are equal, prove that `a/b = c/d`
Write the discriminant of the following quadratic equations:
(x − 1) (2x − 1) = 0
`3x^2-243=0`
`15x^2-28=x`
`4sqrt3x^2+5x-2sqrt3=0`
`36x^2-12ax+(a^2-b^2)=0`
`x^2-2ax+(a^2-b^2)=0`
Find the nature of roots of the following quadratic equations:
`x^2-x+2=0`
Find the nonzero value of k for which the roots of the quadratic equation `9x^2-3kx+k=0` are real and equal.
If the quadratic equation `(1+m^2)x^2+2mcx+(c^2-a^2)=0` has equal roots, prove that `c^2=a^2(1+m^2)`
