In an auditorium, (2174 + x) chairs
are placed in such a way that the
number of rows is equal to the
number of columns. Find the least
value of x.pls do on paper and then send me
Answers
Answer:
number of rows = columns = 47
Step-by-step explanation:
let the number of rows = n.
As the number of rows and columns are equal, the total number of chairs placed in the auditorium = n * n = n²
Given n² = 2174 + x
here x = a non negative integer. we have to find the minimum value of x so that the above equation is valid.
Perfect squares nearest to above 2209.
So let n² = 2174 + x = 2209
x = 47
n = 47.
Hey Bro!
I can't do it on a paper because I use a PC.
The camera gives a reversed image.
But I can answer your Question in a simple way.
Given, no. of rows = no. of coloumns
SO, no. of chairs = no. of rows × no. of coloumns= n²
In a simple way, find the nearest perfect square root of 2174
√2174 = 46.62617290749907= 46.6
So, no.of chairs = 47²=2209.
To find x, 2174+x = 2209.
x = 2209- 2174 = 35.
HOPE IT HELPS YOU.
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