" The area bounded by min."(|x|,|y|)=2" and "max.(|x|,|y|)=4" is: (in sq.units) "

The area bounded by min (|x|,|y|)=2, and max(|x|,|y|)=4 can be

Area bounded by the min. {|x|,|y|}=1 and the max. {|x|,|y|}=2 is

Area bounded by the min. {|x|,|y|}=1 and the max. {|x|,|y|}=2 is

Area bounded by the min. {|x|,|y|}=1 and the max. {|x|,|y|}=2 is

" The area bounded by the curve "y=x(x-3)^(2)" and "y=x" is (in sq.units "

The area of the region of the plane bounded by max(|x|,|y|)<=1 and xy<=(1)/(2) is (1)/(2)+1n2 sq.units (b) 3+1n2 sq.units (31)/(4)sq. units (d)1+21n2 sq.units

[" The area bounded by "],[y=(1)/(x^(2)-2x+2)" and "x" -axis is "],[0 pi" sq units "],[[(pi)/(2)" sq units "],[" 2sq units "],[pi" sq units "]]

Assertion (A) : The area bounded by y^(2)=8x and x^(2)=8y is (64)/(3) sq. units. Reason ( R ) : The area bounded by y^(2)=4ax and x^(2)=4by is (16ab)/(3) sq. units. The correct answer is

The area bounded by the curves x=-2y^(2) and x=1-3y^(2) is (in Sq. units)