Let f: [-2, 3] -> [0, oo) be a continu...

Let `f: [-2, 3] -> [0, oo)` be a continuous function such that `f (1-x) =f(x)` for all `x in [-2,3]`.If `R_1` is the numerical value of the area of the region bounded by `y = f(x), x-2, x = 3` and the axis of `x and R_2 =int_-2^3 x f(x) dx` , then

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Let f:[-2,3] to [0, oo) b e a continuous function such that f(1-x)=f(x) for all x in [-2, 3] . If R_(1) is the numerical value of the area of the region bounded by y=f(x), x = -2, x=3 and the axis of x and R_(2)=int_(-2)^(3)x f(x) dx , then:

Let f:[-2,3]rarr[0,oo) be a continuous function such that f(1-x)=f(x) for all x in[-2,3]. If R_(1) is the numerical value of the area of the region bounded by y=f(x),x-2,x=3 and the axis of x and R_(2)=int_(-2)^(3)xf(x)dx, then

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Let f : [-1, 2]to [0, oo) be a continuous function such that f(x)=f(1-x), AA x in [-1, 2] . If R_(1)=int_(-1)^(2)xf(x)dx and R_(2) are the area of the region bounded by y=f(x), x=-1, x=2 and the X-axis. Then :

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Let `f: [-2, 3] -> [0, oo)` be a continuous function such that `f (1-x) =f(x)` for all `x in [-2,3]`.If `R_1` is the numerical value of the area of the region bounded by `y = f(x), x-2, x = 3` and the axis of `x and R_2 =int_-2^3 x f(x) dx` , then

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