Balbharti Maharashtra State Board Class 8 Maths Solutions covers the Practice Set 7.1 8th Std Maths Answers Solutions Chapter 7 Variation.
Variation Class 8 Maths Chapter 7 Practice Set 7.1 Solutions Maharashtra Board
Std 8 Maths Practice Set 7.1 Chapter 7 Solutions Answers
Question 1.
Write the following statements using the symbol of variation.
- Circumference (c) of a circle is directly proportional to its radius (r).
- Consumption of petrol (l) in a car and distance traveled by that car (d) are in direct variation.
Solution:
- c β r
- l β d
Question 2.
Complete the following table considering that the cost of apples and their number are in direct variation.
| Number of apples (x) | 1 | 4 | __ | 12 | __ |
| Cost of apples (y) | 8 | 32 | 56 | __ | 160 |
Solution:
The cost of apples (y) and their number (x) are in direct variation.
β΄y β x
β΄y = kx β¦(i)
where k is the constant of variation
i. When, x = 1, y = 8
β΄ Substituting, x = 1 and y = 8 in (i), we get y = kx
β΄ 8 = k Γ 1
β΄ k = 8
Substituting k = 8 in (i), we get
y = kx
β΄ y = 8x β¦(ii)
This the equation of variation
ii. When,y = 56, x = ?
β΄ Substituting y = 56 in (ii), we get
y = 8x
β΄ 56 = 8x
β΄ x = \(\frac { 56 }{ 8 }\)
β΄ x = 7
iii. When, x = 12, y = ?
β΄ Substituting x = 12 in (ii), we get
y = 8x
β΄ y = 8 Γ 12
β΄ y = 96
iv. When, y = 160, x = ?
β΄ Substituting y = 160 in (ii), we get
y = 8x
β΄ 160 = 8x
β΄ x = \(\frac { 160 }{ 8 }\)
β΄ x = 20
| Number of apples (x) | 1 | 4 | 7 | 12 | 20 |
| Cost of apples (y) | 8 | 32 | 56 | 96 | 160 |
Question 3.
If m β n and when m = 154, n = 7. Find the value of m, when n = 14.
Solution:
Given that,
m β n
β΄ m = kn β¦(i)
where k is constant of variation.
When m = 154, n = 7
β΄ Substituting m = 154 and n = 7 in (i), we get
m = kn
β΄ 154 = k Γ 7
β΄ \(k=\frac { 154 }{ 7 }\)
β΄ k = 22
Substituting k = 22 in (i), we get
m = kn
β΄ m = 22n β¦(ii)
This is the equation of variation.
When n = 14, m = ?
β΄ Substituting n = 14 in (ii), we get
m = 22n
β΄ m = 22 Γ 14
β΄ m = 308
Question 4.
If n varies directly as m, complete the following table.
| m | 3 | 5 | 6.5 | __ | 1.25 |
| n | 12 | 20 | __ | 28 | __ |
Solution:
Given, n varies directly as m
β΄ n β m
β΄ n = km β¦(i)
where, k is the constant of variation
i. When m = 3, n = 12
β΄ Substituting m = 3 and n = 12 in (i), we get
n = km
β΄ 12 = k Γ 3
β΄ \(k=\frac { 12 }{ 3 }\)
β΄ k = 4
Substituting, k = 4 in (i), we get
n = km
β΄ n = 4m β¦(ii)
This is the equation of variation.
ii. When m = 6.5, n = ?
β΄ Substituting, m = 6.5 in (ii), we get
n = 4m
β΄ n = 4 Γ 6.5
β΄ n = 26
iii. When n = 28, m = ?
β΄ Substituting, n = 28 in (ii), we get
n = 4m
β΄ 28 = 4m
β΄ 28 = 4m
β΄ \(m=\frac { 28 }{ 4 }\)
β΄ m = 7
iv. When m = 1.25, n = ?
β΄ Substituting m = 1.25 in (ii), we get
n = 4m
β΄ n = 4 Γ 1.25
β΄ n = 5
| m | 3 | 5 | 6.5 | 7 | 1.25 |
| n | 12 | 20 | 26 | 28 | 5 |
Question 5.
y varies directly as square root of x. When x = 16, y = 24. Find the constant of variation and equation of variation.
Solution:
Given, y varies directly as square root of x.
β΄ y β β4x
β΄ y = k βx β¦(i)
where, k is the constant of variation.
When x = 16 ,y = 24.
β΄ Substituting, x = 16 and y = 24 in (i), we get
y = kβx
β΄24 = kβ16
β΄24 = 4k
β΄ \(k=\frac { 24 }{ 4 }\)
β΄ k = 6
Substituting k = 6 in (i), we get
y = kβx
β΄ y = 6βx
This is the equation of variation
β΄ The constant of variation is 6 and the equation of variation is y = 6βx .
Question 6.
The total remuneration paid to laborers, employed to harvest soybean is in direct variation with the number of laborers. If remuneration of 4 laborers is Rs 1000, find the remuneration of 17 laborers.
Solution:
Let, m represent total remuneration paid to laborers and n represent number of laborers employed to harvest soybean.
Since, the total remuneration paid to laborers, is in direct variation with the number of laborers.
β΄ m β n
β΄ m = kn β¦(i)
where, k = constant of variation
Remuneration of 4 laborers is Rs 1000.
i. e., when n = 4, m = Rs 1000
β΄ Substituting, n = 4 and m = 1000 in (i), we get m = kn
β΄ 1000 = k Γ 4
β΄ \(k=\frac { 1000 }{ 4 }\)
β΄ k = 250
Substituting, k = 250 in (i), we get
m = kn
β΄ m = 250 n β¦(ii)
This is the equation of variation
Now, we have to find remuneration of 17 laborers.
i. e., when n = 17, m = ?
β΄ Substituting n = 17 in (ii), we get
m = 250 n
β΄ m = 250 Γ 17
β΄ m = 4250
β΄ The remuneration of 17 laborers is Rs 4250.
Maharashtra Board Class 8 Maths Chapter 7 Variation Practice Set 7.1 Intext Questions and Activities
Question 1.
If the rate of notebooks is Rs 240 per dozen, what is the cost of 3 notebooks?
Also find the cost of 9 notebooks, 24 notebooks and 50 notebooks and complete the following table. (Textbook pg. no. 35)
| Number of notebooks (x) | 12 | 3 | 9 | 24 | 50 | 1 |
| Cost (In Rupees) (y) | 240 | __ | __ | __ | __ | 20 |
Solution:
As the number of notebooks increases their cost also increases.
β΄ Number of notebooks and cost of notebooks are in direct proportion.
i.
β΄ y = 3 Γ 20
β΄ y = 60
ii.
β΄ y = 9 Γ 20
β΄ y = 180
iii.
β΄ y = 24 Γ 20
β΄ y = 480
iv.
β΄ y = 50 Γ 20
β΄ y = 1000
| Number of notebooks (x) | 12 | 3 | 9 | 24 | 50 | 1 |
| Cost (In Rupees) (y) | 240 | 60 | 180 | 480 | 1000 | 20 |