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Some important formula of percentage

Example: Income of Ram is 25% more than Shyam. Then find Shyam’s income how much percent less than Ram?

Answer:

Example: In an examination, Geeta secured 20% less marks than Laxmi. Then marks secured by Laxmi is how much percent more than Geeta?

Answer:

(iii) If a quantity is first increased by m% and then decreased by m% then net result will be always decreased and it will be equal to

Example: The salary of a person first increased by 10% and then it is decreased by 10% again. Then what will be changed in his salary?

Answer:

The net salary will be decreased.

(iv) If a quantity is first changed (increased or decreased) by m% and then again changed by (increased or decreased) by n% then

(+) means increased
(-) means decreased

Net Change is an increase or decrease according to the sign.

Example 1:

The price of a material is first increased by 25% and then decreased by 30%. Find the net percent change in the final price of that material.

Answer:

At first increased by 25%

Then decreased by 30%

So, Net Percentage change

Net percent change is negative. It means that now the price of that material is decreased.

So, the price of that material is decreased by 12.5%.

Example 2:

The length of a rectangle is increased by 5% and the breadth of that rectangle is decreased by 8%. Find the net change in area.

Answer:

Length increased by 5%

Breadth decreased by 8%

So, Net Percentage change

Net Percentage is negative. It means that are will decrease.
So, the area will decrease by 3.4%.

(v) If the price of commodity increases by m% then to keep the expenditure consumption should be decreased by

Example:

If the price of sugar increases by 16% then by how much percent a householder should decrease its consumption so that the expenditure remains the same on sugar?

Solution:

So, decrease percentage in consumption.

(vi) If the price of the commodity decreases by m% then to keep the expenditure the same. Consumption should be increased by

Example:

The price of pulse decreased by 20%. Then by how much percent a householder should increase its consumption so that the expenditure remains the same on the pulse?

Answer:

The increased percentage in pulse

(vii) Population Concept:

Let the population of a town be x and it changes (increases or decreases) at the rate y% per annum.

Then,

(a) Population after 1 year

(b) Population n years ago

(+) → sign when population increases.

(-) sign when population decreases.

If there is an increase then change in population is

If there is a decrease then change in population is

Example:

# If the annual growth rate of a town in population by 10% and the present population be 10000. What will be the population after 3 years hence?

Answer:

Population after 3 years will be

# Present population of a town is 17280. Population growth is 20%. What was the population 3years ago?

Answer:

Population 3 years ago was

(viii) Value depreciation

If the present value of a machine box be x and it depreciates at the rate y% per annum.

Then,

(a) Value of machine after n years will be

(b) Value of machine n years ago was

Example:

The value of a Lathe machine depreciates at the rate of 20% per annum. If the cost of machine at present is Rs. 200000. Then what will be its worth after 2years?

Answer:

Present value = Rs. 200000

Depreciation = 20% per annum

Year = 2

So, its worth after 2 years will be