Let the straight line x = b divide the a...

Let the straight line x = b divide the area enclosed by `y = (1-x)^(2), y = 0` and `x = 0` into two parts `R_(1) (0 le x le b)` and `R_(2) (b le x le 1)` such that `R_(1) - R_(2) = 1/4`. Then b equals

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Let the straight line x =b divide the area enclosed by y=(1-x)^(2) y=0 and x=0 in to parts R_(1)(0 le x le b) and R_(2) (b le x le 1) such that R_(1)-R_(2)=1/4 then b equals

If the straight line x=b divide the area enclosed by y=(1-x)^(2),y=0 " and " x=0 " into two parts " R_(1)(0le x le b) " and " R_(2)(b le x le 1) " such that " R_(1)-R_(2)=(1)/(4). Then, b equals

Let the straight line x= b divide the area enclosed by y=(1-x)^(2),y=0, and x=0 into two parts R_(1)(0lexleb) and R_(2)(blexle1) such that R_(1)-R_(2)=(1)/(4). Then b equals

Let the straight line x= b divide the area enclosed by y=(1-x)^(2),y=0, and x=0 into two parts R_(1)(0lexleb) and R_(2)(blexle1) such that R_(1)-R_(2)=(1)/(4). Then b equals

Let the straight line x= b divide the area enclosed by y=(1-x)^(2),y=0, and x=0 into two parts R_(1)(0lexleb) and R_(2)(blexle1) such that R_(1)-R_(2)=(1)/(4). Then b equals

Let the straight line x= b divide the area enclosed by y=(1-x)^(2),y=0, and x=0 into two parts R_(1)(0lexleb) and R_(2)(blexle1) such that R_(1)-R_(2)=(1)/(4). Then b equals

Let the straight line x= b divide the area enclosed by y=(1-x)^(2),y=0, and x=0 into two parts R_(1)(0lexleb) and R_(2)(blexle1) such that R_(1)-R_(2)=(1)/(4). Then b equals

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