Question

Product of zeroes of a polynomial x-2x + 3x-4 is.​

Answer 1

Given f(x)=x

Given f(x)=x 2

Given f(x)=x 2 −4x+3 ........... (i)

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by a

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i)

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β=

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= a

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= ac

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= ac

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= ac =

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= ac = 1

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= ac = 13

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= ac = 13

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= ac = 13 =3

Given f(x)=x 2 −4x+3 ........... (i)Comparing (i) with the standard form of quadratic polynomial ax 2 +bx+c=0 . (ii) we get,a=1,b=−4,c=3Let α,β be zeros of equation (i)Product of zeros of equation (ii) is given by ac ∴ Product of zeroes(α,β) of (i) =α⋅β= ac = 13 =3Hence, the answer is 3.