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(x-2) (x-4) (x-3) represents the length breadth and height of a cuboid respectively. of its volume represents a polynomial then find the sum of zeroes and product of zeroes. plz answer quickly

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by mohammedzeba

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by mohammedzeba

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Length = x-2

breadth = x-4

height = x-3

Volume = lbh = (x-2)(x-4)(x-3)

So the polynomial f(x) = (x-2)(x-4)(x-3)

zeroes of f(x) are 2, 4 and 3.

sum of zeroes = 2+4+3 = 9

product of zeroes = 2×4×3 = 24

breadth = x-4

height = x-3

Volume = lbh = (x-2)(x-4)(x-3)

So the polynomial f(x) = (x-2)(x-4)(x-3)

zeroes of f(x) are 2, 4 and 3.

sum of zeroes = 2+4+3 = 9

product of zeroes = 2×4×3 = 24

Certified answers contain reliable, trustworthy information vouched for by a hand-picked team of experts. Brainly has millions of high quality answers, all of them carefully moderated by our most trusted community members, but certified answers are the finest of the finest.

Length= x-2

breadth= x-4

height= x-3

the volume represents a polynomial

thus volume =(x-2)(x-3)(x-4)

=x³-9x²+26x-24

the zeroes f the polynomial are =2 ,3 ,4

then the sum of zeroes = 9

product of zeroes =24

breadth= x-4

height= x-3

the volume represents a polynomial

thus volume =(x-2)(x-3)(x-4)

=x³-9x²+26x-24

the zeroes f the polynomial are =2 ,3 ,4

then the sum of zeroes = 9

product of zeroes =24