Number of points of intersection of n straight lines if n satisfies n+5 Pn+1=(11(n-1)/2) × n+3 Pn is

Question

Number of points of intersection of n straight lines if n satisfies n+5 Pn+1=(11(n-1)/2) × n+3 Pn is (A) 15 (B) 28 (C) 21 (D) 10

Tardigrade Admin · Accepted Answer

n+5 Pn+1=(11(n-1)/2) × n+3 Pn or n+5 Pn+1=((n+5)!/4!)=(11(n-1)/2) ((n+3)!/3!) or (n+5)(n+4)=22(n-1) After solving, we get n=6 or n=7 The number of points of intersection of lines is 6 C2 or 7 C2 ≡ 15 or 21.

Q. Number of points of intersection of n straight lines if n satisfies n+5Pn+1​=211(n−1)​×n+3Pn​ is

15

28

21

10

n+5Pn+1​=211(n−1)​×n+3Pn​ or n+5Pn+1​=4!(n+5)!​=211(n−1)​3!(n+3)!​ or (n+5)(n+4)=22(n−1) After solving, we get n=6 or n=7 The number of points of intersection of lines is 6C2​ or 7C2​≡15 or 21.

Q. Number of points of intersection of $n$ straight lines if $n$ satisfies $^{n + 5} P_{n + 1} = \frac{11 ( n - 1 )}{2} \times^{n + 3} P_{n}$ is