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16. What are the possible expressions for the dimensions of the cuboids whose volumes
are given below?
Volume: 3x² - 12x
Volume: 12ky² +8ky-20k
(1)
(ii)
Answers
Answer:
i) Volume of Cuboid = 3x² - 12x
But we know that, Volume of Cuboid = length × breadth × height
Hence, we shall express the given polynomial as the product of three expressions using factorization.
3x² - 12x = 3x(x - 4)
Thus, the possible expressions for the length, breadth and height are:
Length = 3, breadth = x, height = x - 4
Length = 3, breadth = x - 4, height = x
Length = x, breadth = 3, height = x - 4
Length = x, breadth = x - 4, height = 3
Length = x - 4, breadth = x, height = 3
Length = x - 4, breadth = 3, height = x
ii) Volume of Cuboid = 12ky² + 8ky - 20k
But we know that, Volume of Cuboid = length × breadth × height
Hence, we shall express the given polynomial as the product of three expressions using factorization.
12ky² + 8ky - 20k = 4k(3y² + 2y - 5)
Now taking 3y² + 2y - 5 , find two numbers p, q such that:
p + q = co-efficient of y
pq = product of the co-efficient of y² and the constant term.
p + q = 2 (co-efficient of y)
pq = 3 × (-5) = -15 (product of the co-efficient of y² and the constant term.)
By trial and error method, we get p = 5, q = -3.
Now splitting the middle term of the given polynomial,
3y² + 2y - 5 = 3y² + 5y - 3y - 5
= 3y² - 3y + 5y - 5
= 3y( y -1) + 5( y - 1)
= (3y + 5) ( y - 1)
Volume = 4k( y - 1) (3y + 5)
Thus, the possible expressions for the length, breadth and height is,
Length = 4k, breadth = y - 1, height = 3y + 5.
Length = 4k, breadth = 3y + 5, height = y - 1.
Length = y - 1, breadth = 4k, height = 3y + 5.
Length = y - 1, breadth = 3y + 5, height = 4k.
Length = 3y + 5, breadth = 4k, height = y -1.
Length = 3y + 5, breadth = y - 1, height = 4k