Advertisements
Advertisements
प्रश्न
Solve the following pairs of equations:
`(6)/(x + y) = (7)/(x - y) + 3`
`(1)/(2(x + y)) = (1)/(3( x - y)`
Where x + y ≠ 0 and x - y ≠ 0
Advertisements
उत्तर
The given equations are `(6)/(x + y) = (7)/(x - y) + 3` and `(1)/(2(x + y)) = (1)/(3( x - y)`
Let `(1)/(x + y) = "a" and (1)/(x - y) = "b"`
Then, we have
6a = 7b + 3
⇒ 6a - 7b + 3 ....(i)
And, `(1)/(2)"a" = (1)/(3)"b"`
⇒ 3a = 2b
⇒ 6a = 4b ....(ii)
Substituting the value of 6a in eqn. (i), we get
4b - 7b = 3
⇒ -3b = 3
⇒ b = -1
6a = -4
⇒ a = `-(2)/(3)`
⇒ x + y = `-(3)/(2)` and x - y = -1
Adding both these eqns., we get
2x = `-(5)/(2)`
⇒ x = `-(5)/(4)`
⇒ `-(5)/(4) - y` = -1
⇒ y = `-(5)/(4) + 1`
= `-(1)/(4)`
Thus, the solution set is `(-5/4, -1/4)`.
APPEARS IN
संबंधित प्रश्न
Solve the following pair of linear (simultaneous) equation by the method of elimination by substitution:
0.2x + 0.1y = 25
2(x - 2) - 1.6y = 116
Solve the pair of linear (simultaneous) equation by the method of elimination by substitution:
6x = 7y + 7
7y - x = 8
Solve the pair of linear (simultaneous) equation by the method of elimination by substitution :
y = 4x - 7
16x - 5y = 25
Solve the following pair of linear (Simultaneous ) equation using method of elimination by substitution :
2( x - 3 ) + 3( y - 5 ) = 0
5( x - 1 ) + 4( y - 4 ) = 0
Solve the following pair of linear (simultaneous) equation using method of elimination by substitution :
2x - 3y + 6 = 0
2x + 3y - 18 = 0
Solve th following pair of linear (Simultaneous ) equation using method of elimination by substitution :
`[ 2x + 1]/7 + [5y - 3]/3 = 12`
`[3x + 2 ]/2 - [4y + 3]/9 = 13`
Solve the following pair of linear (simultaneous) equation using method of elimination by substitution:
`[3x]/2 - [5y]/3 + 2 = 0`
`x/3 + y/2 = 2 1/6`
Solve the following simultaneous equations by the substitution method:
2x + y = 8
3y = 3 + 4x
Solve the following simultaneous equations by the substitution method:
5x + 4y - 23 = 0
x + 9 = 6y
Solve the following simultaneous equations by the substitution method:
2x + 3y = 31
5x - 4 = 3y
Solve the following simultaneous equations by the substitution method:
7x - 3y = 31
9x - 5y = 41
Solve the following simultaneous equations by the substitution method:
0.5x + 0.7y = 0.74
0.3x + 0.5y = 0.5
The difference of two numbers is 3, and the sum of three times the larger one and twice the smaller one is 19. Find the two numbers.
The age of the father is seven times the age of the son. Ten years later, the age of the father will be thrice the age of the son. Find their present ages.
A father's age is three times the age of his child. After 12 years, twice the age of father will be 36 more than thrice the age of his child. Find his present age.
* Question modified
Solve by the method of elimination
`x/10 + y/5` = 14, `x/8 + y/6` = 15
Solve by the method of elimination
3(2x + y) = 7xy, 3(x + 3y) = 11xy
The monthly income of A and B are in the ratio 3 : 4 and their monthly expenditures are in the ratio 5 : 7. If each saves ₹ 5,000 per month, find the monthly income of each
