Advertisements
Advertisements
Question
3 bags and 4 pens together cost Rs 257 whereas 4 bags and 3 pens together cost R 324.
Find the total cost of 1 bag and 10 pens.
Solution
Let the cost of a bag be Rs x and that of a pen be Rs y. Then,
3x + 4y = 257 ...(i)
4x + 3y = 324 ....(ii)
Multiplying equation (i) by 3 and equation (ii) by 4, we get
9x + 12y = 770 ...(iii)
16x + 12y = 1296 ....(iv)
Subtracting equation (iii) by equation (iv), we get
16x + 9x = 1296 - 771
=> 7x = 525
`=> x = 525/7 = 75`
Cost of a bag = Rs 75
Putting x = 75 in equation (i), we get
`3 xx 75 + 4y = 257`
=> 225 + 4y = 257
=> 4y = 257 - 225
=> 4y = 32
`=> y = 32/4 = 8`
∴Cost of a pen = Rs 8
∴ Cost of 10 pens = 8 xx 10 = Rs 80
Hence, the total cost of 1 bag and 10 pens = 75 + 80 = Rs 155
APPEARS IN
RELATED QUESTIONS
Solve the following systems of equations:
`1/(2(x + 2y)) + 5/(3(3x - 2y)) = (-3)/2`
`5/(4(x + 2y)) - 3'/(5(3x - 2y)) = 61/60`
Solve the following systems of equations:
`2/(3x + 2y) + 3/(3x - 2y) = 17/5`
`5/(3x + 2y) + 1/(3x - 2y) = 2`
Solve the following systems of equations:
152x − 378y = −74
−378x + 152y = −604
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.
Solve the following set of simultaneous equation.
x + y = 4 ; 2x - 5y = 1
Solve the following set of simultaneous equation.
2y - x = 0; 10x + 15y = 105
Solve the following set of simultaneous equation.
2x - 7y = 7; 3x + y = 22
The solution of the equation 2x – y = 2 is ______
If (2, −5) is the solution of the equation 2x − ky = 14, then find k = ?
For an A.P., t17 = 54 and t9 = 30 find the first term(a) and common difference(d)
