The area bounded by curve `|x/9|+|y/9|=log_b axxlog_a b` where `a,b > 0 a !=b != 1` is

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

Find the area bounded by (|x|)/(a)+(|y|)/(b)=1 , where a gt 0 and b gt 0

The area bounded by (|x|)/(a)+(|y|)/(b)=1 , where a gt 0 and b gt 0 is

The area bounded by the curve x=3y^2-9 and the line x=0,y=0 and y=1 is

The area bounded by the curve y^2 = 9x and the lines x = 1, x = 4 and y = 0, in the first quadrant,is

The area bounded by the curve above the x-axis, between x = a and x = b is

The area bounded by the curves y=f(x) , the x-axis, and the ordinates x=1 and x=b is (b-1)sin(3b+4) . Then f(x) is

The area bounded by the curves y^(2)=4a(x+a) and y^(2)=4b(b-x) , where a, bgt0 units

If the area bounded by the curve y=f(x), x-axis and the ordinates x=1 and x=b is (b-1) sin (3b+4), then-

If the area bounded by the curve y=f(x), x-axis and the ordinates x=1 and x=b is (b-1) sin (3b+4), then find f(x).