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Question

If an open box with a square base is to be made of a given quantity of cardboard of area c2, then show that the maximum volume of the box is c363 cu units.

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Solution

Let the length of side of the square base of open box be x units and its height be y units.
Area of the metal used =x2+4xyx2+4xy=c2y=c2x24x
Now, volume of the box (V)=x2yV=x2.(c2x24x)=14x(c2x2)=14(c2xx3)

On differentiating both sides w.r.t., x , we get
dVdx=14(c23x2)Now,dVdx=0c2=3x2x2=c23x=c3
Again, differentiating Eq. (ii) w.r.t, x, we get
d2Vdx2=14(6x)=32x<0(d2vdx2)atx=c3=32.(c3)<0
Thus, we see that volume (v) is maximum at x=c3.
Maximum volume of the box, (Vx=c3)=14(c2.c3c333)=14.(3c2c3)33=14.2c333=c363


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