If 100 C 50 can be prime factorised as 2α ⋅ 3β ⋅ 5γ ⋅ 7 b where α, β, γ, δ ldots ldots ldots ldots are non-negative integers, then correct relation is/are

Question

If 100 C 50 can be prime factorised as 2α ⋅ 3β ⋅ 5&gamma; ⋅ 7 b where α, β, &gamma;, δ ldots ldots ldots ldots are non-negative integers, then correct relation is/are (A) α<β (B) &gamma;<δ (C) α+δ=β+&gamma;-1 (D) &gamma;+δ=0

Tardigrade Admin · Accepted Answer

We have 100 C 50=((100) !/(50) !(50) !)=2α ⋅ 3β ⋅ 5&gamma; ⋅ 7δ ldots ldots ldots where α, β, &gamma;, δ ldots ldots. are non-negative integers. Exponent of 2 in (100)! ! text is =[(100/2)]+[(100/22)]+[(100/23)]+[(100/24)]+[(100/25)]+[(100/26)] =50+25+12+6+3+1=97 Exponent of 2 in (50) ! text is =[(50/2)]+[(50/22)]+[(50/23)]+[(50/24)]+[(50/25)] =25+12+6+3+1=47 Exponent of 2 in 100 C 50 is =3 ∵ 100 C50=(297/247 ⋅ 247) I=23 ⋅ I In the similar way exponent of 3,5 and 7 in 100 C 50 are 4,0 and 0 respectively. ∴ 100 C 50=23 ⋅ 34 ⋅ 50 ⋅ 70 ldots ldots ldots ⇒ α=3, β=4, &gamma;=0, δ=0

Q. If $^{100} C_{50}$ can be prime factorised as $2^{α} \cdot 3^{β} \cdot 5^{γ} \cdot 7^{b}$ where $α, β, γ, δ \dots\dots\dots\dots$ are non-negative integers, then correct relation is/are

$α < β$

$γ < δ$

$α + δ = β + γ - 1$

$γ + δ = 0$

Q. If 100C50​ can be prime factorised as 2α⋅3β⋅5γ⋅7b where α,β,γ,δ………… are non-negative integers, then correct relation is/are

α<β

γ<δ

α+δ=β+γ−1

γ+δ=0

Q. If $^{100} C_{50}$ can be prime factorised as $2^{α} \cdot 3^{β} \cdot 5^{γ} \cdot 7^{b}$ where $α, β, γ, δ \dots\dots\dots\dots$ are non-negative integers, then correct relation is/are

$α < β$

$γ < δ$

$α + δ = β + γ - 1$

$γ + δ = 0$