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Points to Remember- Direct and Inverse Proportions | Mathematics (Maths) Class 8 PDF Download

Points to Remember 

  • When two quantities,
    x and y, change in a way that their ratio stays the same, they are said to be in direct proportion.
  • If x and yy change such that when one increases, the other decreases proportionally (and the reverse is true), they are in inverse proportion.
  • If x and y are in a direct proportion, then (x/y) = constant.
  •  If x and y are in an inverse variation, then (xy) = constant.

Points to Remember- Direct and Inverse Proportions | Mathematics (Maths) Class 8

We Know That

  • Variable Nature: The value of a variable is not constant and changes over time or circumstances.
  • Inter-Related Quantities: Some quantities have a relationship with others, meaning when one changes, the other also changes. This interrelation is known as variation.
  • Types of Variation:There are two types of variation: (i) Direct Variation (ii) Inverse Variation

Direct Proportion

If two quantities are related in such a way that an increase in one quantity leads to increase in the other and vice versa, then this is a case of direct variation. Also, a decrease in one quantity brings a corresponding decrease in the other.Points to Remember- Direct and Inverse Proportions | Mathematics (Maths) Class 8

Two quantities x and y are said to be in direct proportion, if
(x/y) = k or x = kyPoints to Remember- Direct and Inverse Proportions | Mathematics (Maths) Class 8

Note: 

I. In a direct proportion two quantities x and y vary with each other such that (x/y) remains constant.
II. (x/y) is always a positive number.
III. (x/y) or k is called the constant of variation.

Question for Points to Remember- Direct and Inverse Proportions
Try yourself:
Which type of variation occurs when an increase in one quantity leads to a proportional decrease in the other quantity?
View Solution


Inverse Proportion

If two quantities change in such a manner that, if one quantity increases, the other quantity decreases in the same proportion and vice versa, then it is called Inverse Proportion. Points to Remember- Direct and Inverse Proportions | Mathematics (Maths) Class 8

Two quantities x and y are said to be in inverse proportion,if  x ∝ (1 / y)

x = k / y   ⇒ xy = k

Points to Remember- Direct and Inverse Proportions | Mathematics (Maths) Class 8

Note: 

I. In an inverse proportion, two quantities x and y vary with each other such that xy remains constant.

II. x × y is always a positive number.

III. x × y or k is called the constant of variation in inverse proportion.

Solved Examples

Q 1: Following are the car parking charges near an Airport up to
a. 2 hours Rs 60
b. 6 hours Rs 100
c. 12 hours Rs 14
d. 24 hours Rs 180
Check if the parking charges are in direct proportion to the parking time.

Solution: We know that two quantities are in direct proportion if whenever the values of one quantity increase, then the value of another quantity increase in such a way that ratio of the quantities remains same. Here, the charges are not increasing in direct proportion to the parking time because of 2/60 ≠ 6/100 ≠ 12/140 ≠ 24/180

Q 2: y is directly proportional to x, and y = 24 when x = 4. What is the value of y when x = 3?
a. 18
b. 20
c. 23

d. 43
Ans : a

Solution: Step 1 Find the constant of proportionality:

y is directly proportional to x ⇒ y ∝ x ⇒ y = kx where k is the constant of proportionality.

But y = 24 when x = 4

⇒ 24 = k × 4

⇒ k = 6

Step 2 Write down the equation connecting y and x:

y = kx ⇒ y = 6x

Step 3 Substitute x = 3 into this equation to find the corresponding value of y:

When x = 3, y = 6 × 3 = 18

Q 3. The circumference (C cm) of a circle is directly proportional to its diameter (d cm). The circumference of a circle of diameter 3.5 cm is 11 cm. What is the circumference of a circle of diameter 4.2 cm?
a. 9.17 cm
b. 11.7 cm
c. 13.2 cm
d. 14 cm
Ans: c

Solution: We are told C = 11 when d = 3.5
We need to find the value of C when d = 4.2

Step 1 Find the constant of proportionality:

C is directly proportional to d ⇒ C ∝ d ⇒ C = kd where k is the constant of proportionality.
But C = 11 when d = 3.5
⇒ 11 = k × 3.5
k = 11/3.5 = 22/7

The document Points to Remember- Direct and Inverse Proportions | Mathematics (Maths) Class 8 is a part of the Class 8 Course Mathematics (Maths) Class 8.
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FAQs on Points to Remember- Direct and Inverse Proportions - Mathematics (Maths) Class 8

1. What is direct proportion and how is it different from inverse proportion?
Ans.Direct proportion refers to a relationship between two quantities where, as one quantity increases, the other quantity also increases at a constant rate. In contrast, inverse proportion occurs when one quantity increases while the other decreases at a constant rate. For example, if you double the amount of one variable in direct proportion, the other variable also doubles, whereas in inverse proportion, doubling one variable would halve the other.
2. Can you provide a real-life example of direct proportion?
Ans.A common real-life example of direct proportion is the relationship between distance and time when traveling at a constant speed. If a car travels at a speed of 60 km/h, the distance covered is directly proportional to the time spent driving. For instance, if you drive for 1 hour, you cover 60 km; if you drive for 2 hours, you cover 120 km.
3. How do you solve problems involving direct and inverse proportions?
Ans.To solve problems involving direct proportion, you can set up a ratio equal to another ratio. For example, if x is directly proportional to y, you can express it as x/y = k, where k is a constant. In inverse proportion, if x is inversely proportional to y, you use the relationship x * y = k. You can then rearrange the equation to find the unknown variable.
4. What are some key characteristics of direct and inverse proportions?
Ans.Key characteristics of direct proportion include a constant ratio between the two quantities and a linear graph that passes through the origin. For inverse proportion, the product of the two quantities remains constant, and the graph is hyperbolic, decreasing as one quantity increases and the other decreases.
5. How can understanding direct and inverse proportions help in everyday life?
Ans.Understanding direct and inverse proportions can help in various everyday situations, such as budgeting, cooking, and planning events. For instance, if you know that the cost of groceries is directly proportional to the quantity bought, you can easily calculate your expenses. Similarly, knowing that time spent on tasks may inversely affect the amount of work done helps in managing schedules efficiently.
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