The area bounded by the curves `y=log_(e)x` and `y=(log_(e)x)^(2)` is a)`e-2` sq. units b)`3-e` sq. units c)e sq. units d)`e-1` sq. units

Find the area bounded by y=log_(e)|x|" and "y=0

Find the area bounded by y=|log_(e)|x||" and "y=0

Let f(x)= minimum (x+1,sqrt(1-x)) for all xle1 . Then the area bounded by y=f(x) and the x-axis is a) (7)/(3) sq. units b) 1/6 sq. units c) 11/6 sq. units d) 7/6 sq. units

The area between the curves y = xe ^(x) and y = xe ^(-x) and the line x=1, is a) 2 (e + (1)/(e)) sq unit b)0 sq unit c) 2/e sq unit d) 2 (e - (1)/(e)) sq unit

The area between the curve y=1-|x| and the x axis is equal to a)1 sq unit b) 1/2 sq unit c) 1/3 sq unit d)2 sq unit

The area enclosed between the curves y=ax^(2) and x=ay^(2) (where agt0 ) is 1 sq. units, then value of a is

The area of the triangle formed by the coordinate axes and the normal to the curve y=e^(2x)+x^(2) at the point (0,1) is a)0 b)1 sq unit c) (1)/(2)"sq unit" d)2 sq unit

The area bounded by the curve y=x(1-log_(e)x) and x-axis is a) (e^(2))/(4) b) (e^(2))/(2) c) (e^(2)-e)/(2) d) (e^(2)-e)/(4)