[" 23.The straight line "2x-3y=1" divide the circular region "],[x^(2)+y^(2)<=6],[S={(2,(3)/(4)),((5)/(2),(3)/(4)),((1)/(4),-(1)/(4)),((1)/(8),(1)/(4))}," then the number of "],[" point "(s)" in "S" Iying inside the smaller part is ..."]

The straight line 2x-3y=1 divides the circular region x^(2)+y^(2)<=6 into two parts.If S={(2,(3)/(4)),((5)/(2),(3)/(4)),((1)/(4),-(1)/(4)),((1)/(8),(1)/(4))} then the number of point(s) in s lying inside the smaller part is

The straight line 2x – 3y = 1 divides the circular region x^(2) + y^(2) le 6 into two parts. If S = {(2, (3)/(4)), ((5)/(2), (3)/(4)), ((1)/(4), -(1)/(4)), ((1)/(8), (1)/(4))} , then the number of point(s) in S lying inside the smaller part is

The straight line 2x-3y = 1 divides the circular region x^2+ y^2 le6 into two parts. If S = { ( 2 , 3/4) , (5/2,3/4) , (1/4,-1/4), (1/8,1/4) }, then the number of point(s) in S lying inside the smaller part is

The straight line 2x-3y = 1 divides the circular region x^2+ y^2 le6 into two parts. If S = { ( 2 , 3/4) , (5/2,3/4) , (1/4,-1/4), (1/8,1/4) }, then the number of point(s) in S lying inside the smaller part is

The straight line 2x-3y = 1 divides the circular region x^2+ y^2 le6 into two parts. If S = { ( 2 , 3/4) , (5/2,3/4) , (1/4,-1/4), (1/8,1/4) }, then the number of point(s) in S lying inside the smaller part is

The straight line 2x - 3y = 1 divides the circular region x^2+y^2le6 into two parts. If S = {(2,3/4),(5/2,3/4),(1/4,-1/4),(1/8,1/4)} , then the number of point(s) in S lying inside the smaller part is

The length of the straight line x-3y =1 intercept by the hyperbola x^(2) -4y^(2) =1 is

The length of the straight line x-3y=1 intercept by the hyperbola x^(2)-4y^(2)=1 is