Home
Class 12
MATHS
Find the value of aa n db if the syst...

Find the value of `aa n db` if the system of equation `a^2x-b y=a^2-ba n db x=b^2y=2+4b` (i) posses unique solution (ii) infinite solutions

Text Solution

Verified by Experts

System of equations is
`a^(2)x-by=a^(2)-b" and " bx-b^(2)y =2 +4b`
(i) if system has unique solution then lines must be non- parallel or `Delta ne 0` Hence,
`|{:( a^(2),,-b),(b,,-b^(2)):}| ne0`
`" or " -a^(2)b^(2)+b^(2)ne0`
` " or " b^(2) (1-a^(2)) ne0`
` rArr bne " and "ane=1`
(ii) if system has infinite solutions then lines must be coincident. Hence
`(a^(2))/(b)=(b)/(b^(2)) =(a^(2)-b)/(2+4b)`
`rArr b=0 " or " a = ne 1`
`" if " a=1 " then " 2 + 4b =b-b^(2)`
`" or " b^(2)+3b+2=0`
`rArr b=-2 " or " -1`
`" if " a=-1 , " then " b=-2 " or " -1`
b=0 is not possible
Then ordered pairs (a,b) for which system has infintie solutions are `( 1,-2) (1,-1)(-1,-2)(-1,-1)`
Promotional Banner

Similar Questions

Explore conceptually related problems

Find the value of a and b if the system of equation a^(2)x-by=a^(2)-b and bx=b^(2)y=2+4b(i) posses unique solution (ii) infinite solutions

If the system of equation a^(2)x-by=a^(2)-b and bx-b^(2)y=2+4b possess an infinite number of solution , the possible values of a and are

For what values of a and b, the system of equations 2x+ay+6z=8x+2y+bz=5x+y+3z=4 has: (i) a unique solution (ii) infinitely many solutions no solution

For what values of p and q the system of equations 2x+py+6z=8, x+2y+qz=5, x+y+3z=4 has (i) no solution (ii) a unique solution (iii) in finitely many solutions.

For what values of a and b the system of equations 2 x + ay + 6 z = 8 x+2y+bz=5 x + y + 3 z = 4 , has a unique solution ?

If the system of equations, a^(2) x - ay = 1 - a and bx + (3-2b) y = 3 + a possess a unique solution x = 1 , y = 1 , then

Find the value of k for which the system of equations kx - y = 2, 6x - 2y = 4 has infinitely many solutions

For what values of p and q the system od equations x+y+z=6 x+2y+3z=10 x+2y+pz=q has (i) unique sollution ? (ii) an infinitely many solutions ? (iii) no solution ?