Statement 1 : The area bounded by `2geq m a x` { |x-y|,|x+y| } is 8 sq. units. Statement 2 : The area of the square of side length 4 is 16 sq. units.

Each question has four choices a,b,c and d, out of which only one is correct. Each question contains STATEMENT 1 and STATEMENT 2. If both the statements are TRUE and STATEMENT 2 is the correct explanation of STATEMENT 1 If both the statements are TRUE but STATEMENT 2 is NOT the correct explanation of STATEMENT 1. If STATEMENT 1 is TRUE and STATEMENT 2 is FALSE. If STATEMENT 1 is FALSE and STATEMENT 2 is TRUE. Statement 1 : The area bounded by y=e^x , y=0a n dx=0 is 1 sq. unites. Statement 2 : The area bounded by y=(log)_e x ,x=0,a n dy=0 is 1 sq. units.

Statement 1 : The area bounded by parabola y=x^2-4x+3a n dy=0 is 4/3 sq. units. Statement 2 : The area bounded by curve y=f(x)geq0a n dy=0 between ordinates x=aa n dx=b (where b > a) is int_a^bf(x)dx

The area bounded by the curves y=x(x-3)^2a n dy=x is________ (in sq. units)

If the area bounded by the parabola y=2-x^(2) and the line x+y=0 is A square unit, then the value of A is -

If the area bounded by the parabola y= ax^(2) and x= ay^(2) , a gt 0 is 1 square unit , then the value of a is-

The area bounded by the curves y=|x|-1a n dy=-|x|+1 is 1 sq. units (b) 2 sq. units 2sqrt(2) sq. units (d) 4 sq. units

Find the area bounded by y=-x^(3)+x^(2)+16x and y=4x

The area enclosed by 2|x|+3|y|lt=6 is (a) 3 sq. units (b) 4 sq. units 12 sq. units (d) 24 sq. units

If the area bounded by the curves y^2 = 4ax and x^2 = 4ay is (16a^2)/3 sq- unit then find the area bounded by y^2 = 2x and x^2 = 2y