if 57×91 y is divisible by 36 where x and y are digit then the maximum value of (x + y ) is
Answers
Step-by-step explanation:
Given info : 57x91y is divisible by 36 where x and y are digits.
To find : the maximum value of (x + y) is ..
solution : 57x91y is divisible by 36 it means 57x91 is divisible by 4 and 9.
divisiblity of 4 : last two digits must be divisible by 4.
57x91y is divisible by 4 only when 1y is divisible by 4. and it is possible only when y = 2 or 6 ...(1)
divisiblity of 9 : sum of all digits must be integral multiple of 9.
so, 5 + 7 + x + 9 + 1 + y = 22 + x + y is divisible by 9 when 22 + x + y = 9n , where n is integral multiple.
if y = 2,
22 + x + 2 = 9n
⇒24 + x = 9n
to get positive and one digit value of x we have to choose n = 3
so, 24 + x = 9 × 3 ⇒x = 3
so x = 3 and y = 2
similarly , if y = 6
22 + x + 6 = 9n
⇒28 + x = 9 × 4
⇒28 + x = 36
⇒x = 8
so x = 8 and y = 6
so the maximum value of (x + y) = (8 + 6) = 14
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