Question

if alpha and beta are the two zeroes of the polynomial. find quadratic polynomial whose zeroes 2alpha+3beta ,. 3alpha+2beta​

Answer 1

as I found the Similar question in my book you have missed an equation therefore many people were confused. so please check it

α² + β² can be written as (α + β)² - 2αβ 

p(x) = 2x² - 5x + 7 
a = 2 , b = - 5 , c = 7 

α and β are the zeros of p(x) 

we know that , 
sum of zeros = α + β 
                      = -b/a 
                      = 5/2

α² + β² can be written as (α + β)² - 2αβ 

p(x) = 2x² - 5x + 7 
a = 2 , b = - 5 , c = 7 

α and β are the zeros of p(x) 

we know that , 
sum of zeros = α + β 
                      = -b/a 
                      = 5/2 

product of zeros = c/a 
                           = 7/2
 
2α + 3β and 3α + 2β are zeros of a polynomial.

sum of zeros = 2α + 3β+ 3α + 2β 
                      = 5α + 5β 
                      = 5 [ α + β] 
                     = 5 × 5/2 
                    = 25/2 

product of zeros = (2α + 3β)(3α + 2β)
                          = 2α [ 3α + 2β] + 3β [3α + 2β] 
                         = 6α² + 4αβ + 9αβ + 6β² 
                         = 6α² + 13αβ +  6β² 
                         = 6 [ α² + β² ] + 13αβ 
                         = 6 [ (α + β)² - 2αβ ] + 13αβ 
                         = 6 [ ( 5/2)² - 2 × 7/2 ] + 13× 7/2 
                         = 6 [ 25/4 - 7 ] + 91/2 
                         = 6 [ 25/4 - 28/4 ] + 91/2 
                         = 6 [ -3/4 ] + 91/2 
                        = -18/4 + 91/2 
                        = -9/2 + 91/2 
                        = 82/2 
                        = 41
 
a quadratic polynomial is given by :-

k { x² - (sum of zeros)x + (product of zeros) } 

k {x² - 5/2x + 41} 

k = 2 

2 {x² - 25/2x + 41 ] 

2x² - 25x + 82               is the required polynomial

Answer 2

Answer:

2x²-25x+82

Step-by-step explanation:

pls follow me