What should be subtracted from each of the numbers 54, 71, 75
and 99, so that the remainders are in continued proportion ?
Answers
Answer:
Assume that x be number subtracted from each of the numbers 54, 71, 75 and 99 so that their remainders will be a proportion. ∴ 54 - x , 71 - x , 75 - x , and 99 - x are in proportion. ∴ When x = 3 subtracted from each of the numbers so that the remainders will be a proportion.
Step-by-step explanation:
Step-by-step explanation:
Given:-
The numbers 54, 71, 75 and 99
To find:-
What should be subtracted from each of the numbers 54, 71, 75 and 99, so that the remainders are in continued proportion ?
Solution:-
Given numbers are 54,71,75 and 99
Let the number should be subtracted from each of them be X
Then they becomes
(54-X) ,(71-X) ,(75-X) and (99-X)
If they are in proportion then
(54-X) :(71-X) ::(75-X) : (99-X)
Extremes = (54-X) and (99-X)
Product of extremes = (54-X) × (99-X)
=>54(99-X) -X(99-X)
=>5346 -54X -99X +X^2
=>5346 -153 X +X^2
Product of extremes = X^2-153X+5346
Means = (71-X) and (75-X)
Product of means = (71-X) ×(75-X)
=>71(75-X)-X(75-X)
=>5325-71X-75X+X^2
=>5325 -146 X +X^2
Product of means = X^2-146X+5325
We know that
In proportion,
The product of extremes = The Product of means
=>X^2-153X+5346 = X^2-146X+5325
On cancelling X^2 both sides then
=>-153X+5346 = -146X +5325
=>5346 -5325 = -146X+153X
=>21 = 7X
=>7X = 21
=>X =21/7
=>X = 3
Therefore,The number = 3
Answer:-
The required number for the given problem = 3
Check:-
If X = 3 then the numbers become
54-3=51
71-3=68
75-3=72
99-3=96
Product of extremes = 51×96= 4896
Product of means = 68×72= 4896
They are in proportion.
Verified the given relation.
Used formulae:-
- Equality of ratios is called the Proportion.
- In proportion,
The product of extremes = The Product of means