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Question

If m1 and m2 are the roots of the equation x2+(3+2)x+(31)=0, then the area of the triangle formed by the lines y=m1x, y=m2x and y=2, is

A
3311 sq. units
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B
33+11 sq. units
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C
33+7 sq. units
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D
337 sq. units
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Solution

The correct option is B 33+11 sq. units
Given lines are y=m1x, y=m2x and y=2


The coordinates of the vertices of the given triangle are
(0,0),(2m1,2) and (2m2,2)

So, area of the triangle
=12∣ ∣ ∣ ∣002/m122/m2200∣ ∣ ∣ ∣

=124m14m2=2m2m1m1m2

As m1 and m2 are roots of the equation x2+(3+2)x+(31)=0, so
m1+m2=32 and m1m2=31

|m1m2|=(m1+m2)24m1m2|m1m2|=(3+2)24(31)|m1m2|=3+4+4343+4|m1m2|=11

Therefore, area of the triangle
=2m2m1m1m2=2×1131=11(3+1)
=(33+11) sq. units

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