Given equations 2x + 4y = 6 and 4x + 8y = 6
then,
a1/a2 = 2/4 = 1/2;
b1/b2 = 4/8 = 1/2;
c1/c2 = 6/6 = 1
? a1/b2 = b1/b2 ? c1/c2
So there is no solution for these equations.
Let the number of gold coins initially be x and the number of non-gold coins be y.
According to the question,
3x = y
When 10 more gold coins, total number of gold coins becomes x + 10 and the number of non-gold coins remain the same at y.
Now, we have 2(x + 10) = y
Solving these two equations, we get
x = 20 and y = 60.
Total number of coins in the collection at the end is equal to
x + 10 + y = 20 + 10 + 60 = 90.
Given,
(x + y - 8)/2 = (x + 2y - 14)/3 = (3x + y - 12)/11
? (x + y - 8)/2 = (x + 2y - 14)/3
? 3x + 3y - 24 = 2x + 4y - 28
? 3x + 3y - 2x - 4y = -28 + 24
x - y = -4 ...(i)
Again, (x + 2y - 14)/3 = (3x + y - 12)/11
? 11x + 22y - 154 = 9x + 3y - 36
? 2x + 19y = 118 ..(ii)
On multiplying Eq. (i) by 2 and subtracting from Eq., we get
2x - 2y = -8
2x + 19y = 118
-------------------
-21y = -126
? y = 6
On putting the value of y in Eq. (i), we get
x - 6 = -4
? x = 2
? x = 2 and y = 6
[?3 + x + ?3 - x] / [?3 + x - ?3 - x] = 2
Let ?3 + x = a and ?3 - x = b
Then, (a + b) / (a - b) = 2/1
? a + b = 2a - 2b
? a = 3b
? ?3 + x = 3?3 - x
On squaring bothv sides, we get
(?3 + x)2 = (3?3 - x)2
? 3 + x = 9(3 - x)
? 3 + x = 27 - 9x
? 10x = 24
? x = 12/5
ax + by = c and dx + ey = f
a1/a2 = a/d, b1/b2 = b/e, c1/c2 = c/f
? b1/b2 ? c1/c2
? b/e ? c/f
it represent a pair of parallel lines.
? a1/a2 ? b1/b2
? a/d ? b/e
Therefore, system has unique solutions and represents a pair of intersecting lines.
Let the cost of one chair be ? x
and cost of one table be ? y.
By given condition,
10x + 6y = 6200 ..(i)
and 3x + 2y = 1900
? 9x + 6y = 5700 ...(ii)
On subtracting Eq. (ii), we get
x = ? 500
From Eq (i),
5000 + 6y = 6200
? 6y = 1200
? y = ? 200
The cost of 4 chair and 5 tables
= 4x + 5y
= 2000 + 1000
= ? 3000
Given, 2a + 3b = 17
and 2a + 2 - 3b + 1 = 5
? 22 x 22 - 3b x 31 = 5
? 4.2a - 3.3b = 5
Let 2a = x amd 3b = y
Then, x + y = 17 ...(i)
4x - 3y = 5 ...(ii)
On multiplying Eq. (i) by 3 and adding to Eq (ii), we get
3x + 3y = 51
4x - 3y = 5
------------------
7x = 56
? x = 8
On putting the value of x in Eq. (i), we get
8 + y = 17
? y = 9
Now, 2a = x
? 2a = 8 (2)3
? 3b = y = 9
? 3b = 32
? b = 2
Hence, a = 3 and b = 2
(p/x) + (q/y) = m ..(i)
(q/x) + (p/y) = n ...(ii)
On multiply Eq (i) by q and Eq. (ii) by p and subtracting, we get
(pq/x) + (q2)/y = mq
(pq/x) + (p2)/y = np
-----------------------------------------
(q2/y) - (p2/y) = mq - np
? (q2 - p2) = y(mq - np)
? y = (q2 - p2)/mp - np = (p2 - q2)/np - mq
Again, on multiplying Eq. (i) by p and Eq. (ii) by q and subtracting, we get
(p2/x) + (pq/y) = mp
(q2/x) + (pq/y) = nq
-----------------------------------------
(p2/x) - (q2/x) = mp - nq
? (p2 - q2) = x (mp - nq)
? x = (p2 - q2)/(mp - nq)
? x = (p2 - q2)/(mp - nq)
and y = (p2 - q2) / (np - mq)
Let the capital of one is x and that of another is y .
According to the question.
x + 100 = 2(y - 100)
x + 100 = 2y - 200
or x - 2y = -300 ...(i)
Again, according to the question
y + 10 = 6(x - 10)
? y + 10 = 6x - 10
? 6x - y = 70 ..(ii)
On multiplying Eq. (ii) by 2 and subtracting from Eq. (i) , we get
x - 2y = -300
12x - 2y = 140
----------------
-11x = -440
? x = 40
On putting the value of x in Eq. (i) , we get
40 - 2y = -300
? 2y = 340
? y = 170
So, their capital are ? 40 and ? 170.
Let the incomes of two persons be 8x and 5x and their expenditure be 2y and y , respectively.
? Saving = Income - Expenditure
? 1000 = 8x - 2y ...(i)
and 1000 = 5x - y ...(ii)
On multiplying Eq. (ii) by 2 and subtracting from Eq. . (i) , we get
8x - 2y = 1000
10x - 2y = 2000
----------------------
-2x = -1000
? x = 500
? Monthly incomes are
8x = ? 4000 and
5x = ? 2500
? Difference = ? 4000 - 2500 = ? 1500
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