Q2.
Ans: ∵ LCM of 2, 4 and 6 = 12
∴ Multiplying both sides by 12, we have
or
6n – 9n + 10n = 252
or
7n = 252
or
n = 252/7 = 36
∴ n = 36
Check:
∴ LHS = RHS
Q3.
Ans: ∵ LCM of 3, 6 and 2 is 6.
∴ Multiplying both sides by 6, we have
or 6x + 42 – 16x = 17 – 15x
or (6 – 16)x + 42 = 17 – 15x
or –10x + 42 = 17 – 15x
Transposing 42 to RHS and –15x to LHS, we have
–10x + 15x = 17 – 42 or 5x = –25
or
5x = –25
or
x = -25/5 = -5 (Dividing both sides by 5)
∴ x = –5
Check:
∴ LHS = RHS
Q4.
Ans: ∵ LCM of 3 and 5 is 15.
∴ Multiplying both sides by 15, we have
or
5(x – 5) = 3(x – 3)
or
5x – 25 = 3x – 9
Transposing (–25) to RHS and 3x to LHS, we have
5x – 3x = –9 + 25
or
2x = 16
or
x = 16/2 (Dividing both sides by 2)
∴ x = 8
Check:
= 3/3 = 1
∴ LHS = RHS
Q5.
Ans: ∵ LCM of 4 and 3 is 12.
∴ Multiplying both sides by 12, we have
or
3(3t – 2) – 4(2t + 3) = (4 x2) – 12t
or
9t – 6 – 8t – 12 = 8 – 12t
or
(9 – 8)t – (6 + 12) = 8 – 12t
or
t – 18 = 8 – 12t
Transposing –18 to RHS and –12t to LHS, we have
t + 12t = 8 + 18
or
13t = 26
or
t = 26/13
∴ t = 2
Check:
∴ LHS = RHS
Q6.
Ans: Since, LCM of 2 and 3 is 6.
∴ Multiplying both sides by 6, we have
or
6m – 3(m – 1) = 6 – 2(m – 2)
or
6m – 3m + 3 = 6 – 2m + 4
or
(6 – 3)m + 3 = (6 + 4) – 2m
or
3m + 3 = 10 – 2m
Transposing 3 to RHS and –2m to LHS, we have
3m + 2m = 10 – 3
or 5m = 7
or
m = 7/5 (Dividing both sides by 5)
Check:
∴ LHS = RHS
Simplify and solve the following linear equations.
Q7. 3(t – 3) = 5(2t + 1)
Ans: 3(t – 3) = 5(2t + 1)
⇒ 3t – 9 = 10t + 5
⇒ 3t – 10t = 5 + 9
⇒ -7t = 14
⇒ t = 14/-7
⇒ t = -2
Q8. 15(y – 4) – 2(y – 9) + 5(y + 6) = 0
Ans: 15(y – 4) –2(y – 9) + 5(y + 6) = 0
⇒ 15y – 60 -2y + 18 + 5y + 30 = 0
⇒ 15y – 2y + 5y = 60 – 18 – 30
⇒ 18y = 12
⇒ y = 12/18
⇒ y = 2/3
Q9. 3 (5z – 7) – 2(9z – 11) = 4(8z – 13) – 17
Ans: 3(5z – 7) – 2(9z – 11) = 4(8z – 13) – 17
⇒ 15z – 21 – 18z + 22 = 32z – 52 – 17
⇒ 15z – 18z – 32z = -52 – 17 + 21 – 22
⇒ -35z = -70
⇒ z = -70/-35
⇒ z = 2
Q10. 0.25(4f – 3) = 0.05(10f – 9)
Ans: 0.25(4f – 3) = 0.05(10f – 9)
⇒ f – 0.75 = 0.5f – 0.45
⇒ f – 0.5f = -0.45 + 0.75
⇒ 0.5f = 0.30
⇒ f = 0.30/0.5
⇒ f = 3/5
⇒ f = 0.6
Solve the following equations
1.
2.
3.
4.
5.
Ans:
1.
Multiplying both sides by 3x, we have
or
8x – 3 = 6x
Transposing (–3) to RHS and 6x to LHS, we have
8x – 6x = 3
or
2x = 3
Dividing both sides by 2, we have
x = 3/2
2.
Multiplying both sides by 7 – 6x, we have
or
9x = 105 – 90x
Transposing (–90x) to LHS, we have
9x + 90x = 105
or
99x = 105
or
x = 105/99 (Dividing both sides by 99)
or
x = 35/33
3.
By cross multiplication, we have
9z = 4(z + 15) ⇒ 9z = 4z + 60
Transposing 4z to LHS, we have
9z – 4z = 60
5z = 60 ⇒ z = 60/5 = 12
∴ z = 12
4.
By cross multiplication, we have
5(3y + 4) = –2(2 – 6y)
or
15y + 20 = –4 + 12y
Transposing 20 to RHS and 12y to LHS, we have
15y – 12y = –4 – 20
or
3y = –24
or
y = - 24/3= –8 (Dividing both sides by 3)
or y = –8
5.
By cross multiplication, we have
3 * [7y + 4] = –4 x [y + 2]
or
21y + 12 = –4y – 8
Transposing 12 to RHS and (–4y) to LHS, we have
21y + 4y = –8 – 12
or
25y = –20
or
y = -20/25 (Dividing both sides by 25)
or
y = -20/25 = -4
∴ y = -4/5
Question 6: The ages of Hari and Harry are in the ratio 5: 7. Four years from now the ratio of their ages will be 3: 4. Find their present ages.
Ans: Let the present age of Hari = 5x years
and the present age of Harry = 7x years
After 4 years, Age of Hari = (5x + 4) years
Age of Harry = (7x + 4) years
According to the condition,
(5x + 4) : (7x + 4) = 3 : 4
or
By cross multiplication, we have:
4(5x + 4) = 3(7x + 4)
or
20x + 16 = 21x + 12
Transposing 16 to RHS and 21x to LHS, we have
20x – 21x = 12 – 16
–x = –4 ⇒ x = 4
∴ Present age of Hari = 5 * 4 = 20 years
Present age of Harry = 7 * 4 = 28 years
Question 7: The denominator of a rational number is greater than its numerator by 8. If the numerator is increased by 17 and the denominator is decreased by 1, the number obtained is 3/2. Find the rational number.
Ans: Let the numerator = x
∴ Denominator = x + 8
New numerator = (x) + 17
New denominator = (x + 8) – 1 = x + 7
∴ The new number =
According to the condition, we have
By cross multiplication, we have
2(x + 17) = 3(x + 7) 2x + 3x = 3x + 21
Transposing 34 to RHS and 3x to LHS, we have
2x – 34 = 21 – 34 ⇒ –x = –13
∴ x= 13 ⇒ Numerator = 13
x + 8 = 13 + 8 = 21 ⇒Denominator = 21
∴ The rational number = 13/21
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