Let A be a square matrix with real entries, and let λ be its complex eigenvalue. Suppose v = (v1, v2, . . . , vn) T is a corresponding eigenvector, Av = λv. Prove that the λ is an eigenvalue of A and Av = λv. Here v is the complex conjugate of the vector v, v := (v1, v2, . . . , vn) T .

answer: - (a)

(b) 88 seats

step-by-step explanation:

given: in an auditorium, there are 22 seats in the first row and 28 seats in the second row.

thus first term=

second term=

the number of seats in a row continues to increase by 6 with each additional row.

⇒d= 6

a) given formula :

b)   let the number of seats (n) = 12

substitute n=12 in the explicit rule formed in (a)

∴there are 88 seats in 12 rows.

really your just stupid if you don't know this

step-by-step explanation: