A divided by B = 12 … 4, if A and B reduce 10 times at the same time, find the value of new quotient and remainder of the equation.
12 ... 4/10
Help me
To find the new quotient and remainder of the equation when both A and B are reduced by 10 times, we need to understand the given equation and perform the necessary calculations.
The equation A divided by B equals 12 with a remainder of 4 can be written as:
A = 12B + 4
Now, let's reduce both A and B by 10 times:
New A = A / 10
New B = B / 10
Substituting the new values into the original equation:
New A = (12B + 4) / 10
New B = B / 10
To find the new quotient, we divide New A by New B:
New Quotient = New A / New B
= (12B + 4) / 10B
To find the new remainder, we divide the new numerator (12B + 4) by the new denominator (10B) and obtain the remainder:
New Remainder = (12B + 4) % 10B
So, the value of the new quotient is (12B + 4) / 10B, and the value of the new remainder is (12B + 4) % 10B.