Advertisements
Advertisements
Question
Solve the following systems of equations:
`(x + y)/(xy) = 2`
`(x - y)/(xy) = 6`
Solution
The given system of equation is
`(x + y)/(xy) = 2`
`=> x/(xy) + y/(xy) = 2`
`=> 1/y + 1/x = 2` ...(i)
And `(x - y)/(xy) = 6`
`=> x/(xy) - y/(xy) = 6`
`=> 1/y - y/x = 6` .....(ii)
taking 1/y = v and `1/x= u` the above equations become
v + u = 2 ....(iii)
v - u = 6 ..........(iv)
Adding equation (iii) and equation (iv), we get
v + u + v - u = 2 + 6
=> 2v = 8
=> v = 8/2 = 4
Putting v = 4 in equation (iii), we get
4 + u = 2
=> u = 2 - 4 = 2
Hence ` x = 1/u = 1/(-2) = (-1)/2 and y = 1/v = 1/4`
So, the solution of the given system of equation `x = (-1)/2, y = 1/4`
APPEARS IN
RELATED QUESTIONS
Solve 2x + 3y = 11 and 2x – 4y = – 24 and hence find the value of ‘m’ for which y = mx + 3.
Solve the following simultaneous equations
`1/(3x)-1/(4y)+1=0`;
`1/(5x)+1/(2y)=4/15`
Solve the following systems of equations:
x − y + z = 4
x + y + z = 2
2x + y − 3z = 0
Solve the following systems of equations:
`4/x + 15y = 21`
`3/x + 4y = 5`
7 audio cassettes and 3 video cassettes cost Rs 1110, while 5 audio cassettes and 4 video
cassettes cost Rs 1350. Find the cost of an audio cassette and a video cassette.
Reena has pens and pencils which together are 40 in number. If she has 5 more pencils and
5 less pens, then the number of pencils would become 4 times the number of pens. Find the
original number of pens and pencils.
Solve the following set of simultaneous equation.
3x - 5y = 16; x - 3y = 8
A person starts a job with a fixed salary and yearly increment. After 4 years his salary is ₹ 15000 and after 10 years it becomes ₹ 18000. Then find his monthly salary and increment
The difference between a two digit number and the number obtained by interchanging the digits is 27. What is the difference betw een the two digits of the number?
Solve x + 2y = 10 and 2x + y = 14 by substitution method and hence find the value of m for which y = mx + 8.
