Let p and p + 2 be prime numbers and let Δ = p ! p + 1 ! p + 2 ! p + 1 ! p + 2 ! p + 3 ! p + 2 ! p + 3 ! p + 4 ! Then the sum of the maximum values of α and β , such that p α and p + 2 β divide Δ , is

Question

Let p and p + 2 be prime numbers and let Δ = p ! p + 1 ! p + 2 ! p + 1 ! p + 2 ! p + 3 ! p + 2 ! p + 3 ! p + 4 ! Then the sum of the maximum values of α and β , such that p α and p + 2 β divide Δ , is _______.

TestHub · Accepted Answer

Given, Δ = P ! P + 1 ! P + 2 ! P + 1 ! P + 2 ! P + 3 ! P + 2 ! P + 3 ! P + 4 ! Now using the factorial concept and taking common terms we get, ⇒ Δ = P ! P + 1 ! P + 2 ! 1 1 1 P + 1 P + 2 P + 3 P + 2 P + 1 P + 3 P + 2 P + 4 P + 3 Now on solving determinant we get, 1 1 1 P + 1 P + 2 P + 3 P + 2 P + 1 P + 3 P + 2 P + 4 P + 3 Using operation C 1 → C 1 - C 2 & C 2 → C 2 - C 3 0 0 1 - 1 - 1 P + 3 - 2 P - 4 - 2 P - 6 P + 4 P + 3 = 2 P + 6 - 2 P + 4 = 2 Now putting the value of determinant we get, ⇒ Δ = 2 P ! P + 1 ! P + 2 ! ⇒ Δ = 2 P 3 P - 1 ! P + 1 P - 1 ! P + 2 P + 1 P - 1 ! Which is divisible by P α and P + 2 β So, α = 3 , β = 1

Mathematics - Determinant Question with Solution | TestHub

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