[" 82The equation of the ellipse whose a...

[" 82The equation of the ellipse whose axe coincident with the co-ordinate axes and which touches the "],[" straight lines "3x-2y-20=0" and "x+6y-20=0" ,is "],[[" (a) "(x^(2))/(5)+(y^(2))/(8)=1," (b) "(x^(2))/(40)+(y)/(10)=10," (c) "(x^(2))/(40)+(y^(2))/(10)=1," (d) "(x^(2))/(10)+(bar(y)^(2))/(40)=1]]

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The equation of the ellipse whose axes are coincident with the coordinates axes and which touches the straight lines 3x-2y-20=0 and x+6y-20=0 is (x^(2))/(40)+(y^(2))/(10)=1( b) (x^(2))/(5)+(y^(2))/(8)=1(x^(2))/(10)+(y^(2))/(40)=1 (d) (x^(2))/(40)+(y^(2))/(30)=1

The equation of the ellipse whose axes are coincident with the coordinates axes and which touches the straight lines 3x-2y-20=0 and x+6y-20=0 is (a) (x^2)/(40)+(y^2)/(10)=1 (b) (x^2)/5+(y^2)/8=1 (c) (x^2)/(10)+(y^2)/(40)=1 (d) (x^2)/(40)+(y^2)/(30)=1

The equation of the ellipse whose axes are coincident with the coordinates axes and which touches the straight lines 3x-2y-20=0 and x+6y-20=0 is (x^2)/(40)+(y^2)/(10)=1 (b) (x^2)/5+(y^2)/8=1 (x^2)/(10)+(y^2)/(40)=1 (d) (x^2)/(40)+(y^2)/(30)=1

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