If the product of two Numbers are 360 and their ratio it's 10:9 them find these numbers
Answers
Answered by
13
Solutions :-
Given :
The product of two numbers are 360
Let the two numbers be 10x and 9x respectively.
A/q
=> 10x × 9x = 360
=> 90x² = 360
=> x² = 360/90
=> x² = 4
=> x = √4 = 2
First number = 10x = 10 × 2 = 20
Second number = 9x = 9 × 2 = 18
Hence,
The two numbers are 20 and 18 respectively.
Given :
The product of two numbers are 360
Let the two numbers be 10x and 9x respectively.
A/q
=> 10x × 9x = 360
=> 90x² = 360
=> x² = 360/90
=> x² = 4
=> x = √4 = 2
First number = 10x = 10 × 2 = 20
Second number = 9x = 9 × 2 = 18
Hence,
The two numbers are 20 and 18 respectively.
Answered by
2
Solutions :-
We have,
The product of two numbers = 360
Ratio of the two numbers = 10 : 9
Let the first number be 10x
And second number be 9x
Find the value of x :-
A/q
=> 10x × 9x = 360
=> 90x² = 360
=> x² = 360/90
=> x² = 4
=> x² = 2²
=> x = 2
Therefore,
First number = 10x = 10 × 2 = 20
Second number = 9x = 9 × 2 = 18
Answer : The product of 20 and 18 is equal to 360.
We have,
The product of two numbers = 360
Ratio of the two numbers = 10 : 9
Let the first number be 10x
And second number be 9x
Find the value of x :-
A/q
=> 10x × 9x = 360
=> 90x² = 360
=> x² = 360/90
=> x² = 4
=> x² = 2²
=> x = 2
Therefore,
First number = 10x = 10 × 2 = 20
Second number = 9x = 9 × 2 = 18
Answer : The product of 20 and 18 is equal to 360.
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