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(1 point) Let T'be the region inside the triangle with vertices (0, 0), (3, 0) and...
Let the region R be the triangle with vertices (1, 1), (1,3), (2, 2). Write the...
Let the region R be the triangle with vertices (1, 1), (1,3), (2, 2). Write the iterated integrals for SSR f(x, y)dA 1. in the “dydx” order of integration 2. in the “dxdy” order of integration
Let A be the triangle in the two-dimensional plane with vertices (0, 0), (0, 1), and...
Let A be the triangle in the two-dimensional plane with vertices (0, 0), (0, 1), and (1, 0). Let (X, Y ) be chosen uniformly from this area, that is, (X, Y ) ∼ Unif(A). (a) What is the probability that X ≤ 1/3? (b) What is the probability that Y ≥ 1/2? (c) Conditioned on X ≤ 1/3, what is the probability that Y ≥ 1/2? (d) Are the events X ≤ 1/3 and Y ≥ 1/2 independent?
3. Let S be the triangle with vertices at (0,0), (1,0) and (0,1). Let f (x,...
3. Let S be the triangle with vertices at (0,0), (1,0) and (0,1). Let f (x, y) = e***. Use the change of variables u = x – y, v = x +y to find . f(a,y) dA.
1/3 x + y 7. Consider dA where R is the region bounded by the triangle...
1/3 x + y 7. Consider dA where R is the region bounded by the triangle with vertices (0,0), (2,0), V= x+y X-y and (0,-2). The change of variables u=- defines a transformation T(x,y)=(u,v) from the xy-plane 2 to the uv-plane. (a) (10 pts) Write S (in terms of u and v) using set- builder notation, where T:R→S. Use T to help you sketch S in the uv-plane by evaluating T at the vertices. - 1 a(u,v) (b) (4 pts)...
plane, and outside the cone z-5V x2 (1 point Find the volume of the solid that lies within the sphere x2 ,2 + z2-25, above the x (1 point) Find the mass of the triangular region with vertices (0,0),...
plane, and outside the cone z-5V x2 (1 point Find the volume of the solid that lies within the sphere x2 ,2 + z2-25, above the x (1 point) Find the mass of the triangular region with vertices (0,0), (1, 0), and (0, 5), with density function ρ (x,y) = x2 +y.
plane, and outside the cone z-5V x2 (1 point Find the volume of the solid that lies within the sphere x2 ,2 + z2-25, above the x
(1...
Write function to check if point O is located inside or outside of the 2D triangle...
Write function to check if point O is located inside or outside of the 2D triangle ABC The coordinates of the vertices are defined inside Coordinates.dat file. Read this file inside main m-file and provide the coordinates as an input to the function. Also ask user to input coordinates of the point O and provide it as input to the function as well. The output of the function should be a message, saying that the point is located inside or...
1 (2AB+AC) , and k be a point Let P be a point inside a triangle...
1 (2AB+AC) , and k be a point Let P be a point inside a triangle ABC such that AP on side AC, such that 3 AT TC .Point P is on the line segment connecting B and T. Find the value of k .
1 (2AB+AC) , and k be a point Let P be a point inside a triangle ABC such that AP on side AC, such that 3 AT TC .Point P is on the line segment...
Use a change of variables to find the volume of the solid region lying below the surface -f(x, y) and above the plane region R x, y)xy)e- R: region bounded by the square with vertices (4, 0), (6, 2),...
Use a change of variables to find the volume of the solid region lying below the surface -f(x, y) and above the plane region R x, y)xy)e- R: region bounded by the square with vertices (4, 0), (6, 2), (4, 4), (2, 2)
Use a change of variables to find the volume of the solid region lying below the surface -f(x, y) and above the plane region R x, y)xy)e- R: region bounded by the square with vertices (4, 0),...
Let C be a triangle in the x-y plane with vertices (x1,y1), (x2y2) and (x3,y3) arranged so that C...
Let C be a triangle in the x-y
plane with vertices (x1,y1), (x2y2) and (x3,y3) arranged so that C
is positively-oriented.
Let C be a triangle in the xy-plane with vertices (x,y), (z2,p), and (z3,U3) arranged so that C is positively-oriented. a.) Sketch such a triangle and indicate its orientation. b.) Apply Green's Theorem to compute the area of the triangle as a (sum of) path integral(s) around the boundary. Get a formula for area in terms of the coordinates...
9. [15 Points) Let C be the boundary of the triangle with vertices (1, 1), (2,...
9. [15 Points) Let C be the boundary of the triangle with vertices (1, 1), (2, 3) and (2, 1), oriented positively i.e. counterclockwise). Let F be the vector field F(1, y) = (e* + y²)i + (ry + cos y)j. Compute the line integral F. dr. 10. (15 Points) Let S be the portion of the paraboloid z = 1-rº-ythat lies on and above the plane z = 0. S is oriented by the normal directed upwards. If F...
Let the region R be the triangle with vertices (1, 1), (1,3), (2, 2). Write the iterated integrals for SSR f(x, y)dA 1. in the “dydx” order of integration 2. in the “dxdy” order of integration
3. Let S be the triangle with vertices at (0,0), (1,0) and (0,1). Let f (x, y) = e***. Use the change of variables u = x – y, v = x +y to find . f(a,y) dA.
1/3 x + y 7. Consider dA where R is the region bounded by the triangle with vertices (0,0), (2,0), V= x+y X-y and (0,-2). The change of variables u=- defines a transformation T(x,y)=(u,v) from the xy-plane 2 to the uv-plane. (a) (10 pts) Write S (in terms of u and v) using set- builder notation, where T:R→S. Use T to help you sketch S in the uv-plane by evaluating T at the vertices. - 1 a(u,v) (b) (4 pts)...
plane, and outside the cone z-5V x2 (1 point Find the volume of the solid that lies within the sphere x2 ,2 + z2-25, above the x (1 point) Find the mass of the triangular region with vertices (0,0), (1, 0), and (0, 5), with density function ρ (x,y) = x2 +y.
plane, and outside the cone z-5V x2 (1 point Find the volume of the solid that lies within the sphere x2 ,2 + z2-25, above the x
(1...
1 (2AB+AC) , and k be a point Let P be a point inside a triangle ABC such that AP on side AC, such that 3 AT TC .Point P is on the line segment connecting B and T. Find the value of k .
1 (2AB+AC) , and k be a point Let P be a point inside a triangle ABC such that AP on side AC, such that 3 AT TC .Point P is on the line segment...
Use a change of variables to find the volume of the solid region lying below the surface -f(x, y) and above the plane region R x, y)xy)e- R: region bounded by the square with vertices (4, 0), (6, 2), (4, 4), (2, 2)
Use a change of variables to find the volume of the solid region lying below the surface -f(x, y) and above the plane region R x, y)xy)e- R: region bounded by the square with vertices (4, 0),...
Let C be a triangle in the x-y
plane with vertices (x1,y1), (x2y2) and (x3,y3) arranged so that C
is positively-oriented.
Let C be a triangle in the xy-plane with vertices (x,y), (z2,p), and (z3,U3) arranged so that C is positively-oriented. a.) Sketch such a triangle and indicate its orientation. b.) Apply Green's Theorem to compute the area of the triangle as a (sum of) path integral(s) around the boundary. Get a formula for area in terms of the coordinates...
9. [15 Points) Let C be the boundary of the triangle with vertices (1, 1), (2, 3) and (2, 1), oriented positively i.e. counterclockwise). Let F be the vector field F(1, y) = (e* + y²)i + (ry + cos y)j. Compute the line integral F. dr. 10. (15 Points) Let S be the portion of the paraboloid z = 1-rº-ythat lies on and above the plane z = 0. S is oriented by the normal directed upwards. If F...
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