Related MCQs

• Observe the figure. It is given that the function has no limit as (x, y) → (0 ,0) along the paths given in the figure. Then which of the following could be f(x, y)
• Two men on a 3-D surface want to meet each other. The surface is given by \(f(x,y)=\frac{x^6.y^7}{x^{13}+y^{13}}\). They make their move horizontally or vertically with the X-Y plane as their reference. It was observed that one man was initially at (400, 1600) and the other at (897, 897). Their meet point is decided as (0, 0). Given that they travel in straight lines, will they meet?
• Two men on a 3-D surface want to meet each other. The surface is given by \(f(x,y)=\frac{x^{-6}.y^7}{x+y}\). They make their move horizontally or vertically with the X-Y plane as their reference. It was observed that one man was initially at (200, 400) and the other at (100, 100). Their meet point is decided as (0, 0). Given that they travel in straight lines, will they meet?
• Given that limit exists find \(lt_{(x,y,z)\rightarrow(-2,-2,-2)}\frac{sin((x+2)(y+5)(z+1))}{(x+2)(y+7)}\)
• Find \(lt_{(x,y,z,w)\rightarrow(0,0,0,0)}\frac{x^{-6}.y^2.(z.w)^3}{x+y^2+z-w}\)
• Find \(lt_{(x,y,z)\rightarrow(0,0,0)}\frac{sin(x).sin(y)}{x.z}\)
• Find \(lt_{(x,y,z)\rightarrow(0,0,0)}\frac{y^2.z^2}{x^3+x^2.(y)^{\frac{4}{3}}+x^2.(z)^{\frac{4}{3}}}\)
• Two men on a surface want to meet each other. They have taken the point (0, 0) as meeting point. The surface is 3-D and its equation is f(x,y) = \(\frac{x^{\frac{-23}{4}}y^9}{x+(y)^{\frac{4}{3}}}\). Given that they both play this game infinite number of times with their starting point as (908, 908) and (90, 180)(choosing a different path every time they play the game). Will they always meet?