Advertisements
Advertisements
Question
Solve for x and y:
`(bx)/a - (ay)/b + a + b = 0, bx – ay + 2ab = 0`
Solution
The given equations are:
`(bx)/a - (ay)/b + a + b = 0`
By taking LCM, we get:
`b^2x – a^2y = -a^2b – b^2a` …..(i)
and bx – ay + 2ab = 0
bx – ay = -2ab …….(ii)
On multiplying (ii) by a, we get:
`abx – a^2y = -2a^2b` ……(iii)
On subtracting (i) from (iii), we get:
`abx – b^2x = 2a^2b + a^2b + b^2a = -a^2b + b^2a`
`⇒x(ab – b^2) = -ab(a – b)`
⇒x(a – b)b = -ab(a – b)
`∴x = (−ab(a−b))/((a−b)b) = -a`
On substituting x = -a in (i), we get:
`b^2(-a) – a^2y = -a^2b – b^2a`
`⇒ -b^2a – a^2y = -a^2b – b^2a`
`⇒ -a^2y = -a^2b`
⇒ y = b
Hence, the solution is x = -a and y = b.
APPEARS IN
RELATED QUESTIONS
A motor boat whose speed is 24 km/h in still water takes 1 hour more to go 32 km upstream than to return downstream to the same spot. Find the speed of the stream.
Find the values of k for which the system
2x + ky = 1
3x – 5y = 7
will have (i) a unique solution, and (ii) no solution. Is there a value of k for which the
system has infinitely many solutions?
Find the value of k for which the system of equations has a unique solution:
4x - 5y = k,
2x - 3y = 12.
A lady has only 50-paisa coins and 25-paisa coins in her purse. If she has 50 coins in all totaling Rs.19.50, how many coins of each kind does she have?
Find the numbers such that the sum of thrice the first and the second is 142, and four times the first exceeds the second by 138.
A two-digit number is such that the product of its digits is 35. If 18 is added to the number, the digits interchange their places. Find the number.
The denominator of a fraction is greater than its numerator by 11. If 8 is added to both its numerator and denominator, it becomes `3/4`. Find the fraction.
A lending library has fixed charge for the first three days and an additional charge for each day thereafter. Mona paid ₹27 for a book kept for 7 days, while Tanvy paid ₹21 for the book she kept for 5 days find the fixed charge and the charge for each extra day
Find the value of k for which the system of linear equations has an infinite number of solutions.
2x + 3y=9,
6x + (k – 2)y =(3k – 2
Two straight paths are represented by the equations x – 3y = 2 and –2x + 6y = 5. Check whether the paths cross each other or not.
