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Question 4 The Area of a triangle with vertex (4,3), (4, -3) and (7,-3) can be...
Question 4 The Area of a triangle with vertex (4,3), (7,3) and (7, 7) can be...
Question 4 The Area of a triangle with vertex (4,3), (7,3) and (7, 7) can be obtained through double integration. Chose the correct combination of require integration and the area ОА dydx = 10 square unit 7 4x - 7 3 B. None of the above OC $ 523, oxo dx dy = 6 square unit 4 7 + 3y dx dy = 9 square unit ОЕ .7 4X-7 3 dydx = 9 square unit 3
السلال في The Area of a triangle with vertex (4,3), (4, -3) and (7,-3) can be...
السلال في The Area of a triangle with vertex (4,3), (4, -3) and (7,-3) can be obtained through double integration Chose the correct combination of require integration and the area None of the above AO -2x +11 dydx = 10 square unit BO -2x +11 dydx = 12 square unit 11-y DO dx dy = 11 square unit 11-y ΕΟ 2 dx dy= 9 square unit
The Area of a triangle with vertex (4,3), (7,3) and (7, 7) can be obtained through...
The Area of a triangle with vertex (4,3), (7,3) and (7, 7) can be obtained through double integration. Chose the correct combination of require integration and the area OA 7 7 Sy S7+3; dx dy= 10 square unit 4 B. 7 4x-7 3 Li dydx = 10 square unit 4 3 $, 57431 dx dy = 9 square unit 4 OD 4x-7 3 dydx = 6 square unit O E. None of the above
only final answer , no explaining required Question 13 Find the equation of the plane tangent...
only final answer , no explaining required
Question 13 Find the equation of the plane tangent to f(x,y) = 5x²-27*-47-15 at the point (1, - 2) X+ Answer: 9 conds. 7 Question 14 8 9 10 11 15 12 12 A Moving to another question will save this response. R 1 15 n -3 Evaluate the double integral: SS (3x - 5y) da, n , where R ={(x,y)| – 15xs2 and Osys 1). Moving to another question will save this...
/4 Question An area of square, drea ofa rectangle and triangle can be calculated by using...
/4 Question An area of square, drea ofa rectangle and triangle can be calculated by using the given formula: sqareaa (renww value from the functioi area is reciabgle-(retrn valwe from the function is area int) ceouatre -D-(return value fromtheneion e s double t and s s formula must be use when the values for the sides of the triangle are whether you want to calculate the area of square or a. b and c are the sides of the triangle...
Chapter 11, Review Exercises, Question 015 (a) Find the area of the triangle with vertices A...
Chapter 11, Review Exercises, Question 015 (a) Find the area of the triangle with vertices A (6,4,3), B (4,6,4), and C(11,9, 1). Enter the exact answer. Area = Edit (b) Use the result in part (a) to find the length of the altitude from vertex C to side AB. Enter the exact answer. Length ? Edit Chapter 11, Review Exercises, Question 017 Consider the points A(3,-3,2), B(4, -5,0), C(-1,-4,0), D (6,2, -3) (a) Find the volume of the parallelepiped that...
need help with #8 and #13. w praxe ved at the way from the w orse...
need help with #8 and #13.
w praxe ved at the way from the w orse variables so that it to the positive text 8.6. Excercists sin 231 charged surface, S, of charge density p, the electrostatic po- cos 6. Given a charger social at & point (a,b,c) not on S is , %* wwward with vertex , 2 =2 2r m. s (-a)? + (y - 3)2+(2-cz. s is the cylindrical surface 3* + y = 4,03% ant find...
please anyone answer all the questions as soon please 2 4 3 3 4 1. Given...
please anyone answer all the questions as soon please
2 4 3 3 4 1. Given three points A = (0,–8, 10), B = (2, -5, 11), C = (-4,-9, 7) in R3. (a) Show that these three points are not collinear (not in a straight line). (b) Find the area of the triangle ABC. (c) Find the scalar equation of the plane containing the points A, B and C. (d) Find a point D on the plane such that...
Recall the definition of the degree of a vertex in a graph. a) Suppose a graph has 7 vertices, each of degree 2 or 3. Is the graph necessarily connected ? b) Now the graph has 7 vertices, each degree...
Recall the definition of the degree of a vertex in a graph. a)
Suppose a graph has 7 vertices, each of degree 2 or 3. Is the graph
necessarily connected ?
b) Now the graph has 7 vertices, each degree 3 or 4. Is it
necessarily connected?
My professor gave an example in class. He said triangle and a
square are graph which are not connected yet each vertex has degree
2.
(Paul Zeitz, The Art and Craft of Problem...
Q1. Q2. Q3. Q4. Question 4 (2 marks) Attempt 1 A surface is described by the equation re10y+9y For a su...
Q1.
Q2.
Q3.
Q4.
Question 4 (2 marks) Attempt 1 A surface is described by the equation re10y+9y For a surface defined by a vector R(t,y)y,z(ry), the element of surface area is given by dS For the given surface, determine the cross product Each component should be expressed using the correct Maple syntax; for example, one component might be: -31+7'x exp(-11 y) The first component of the cross product is The second component of the cross product is The third...
Question 4 The Area of a triangle with vertex (4,3), (7,3) and (7, 7) can be obtained through double integration. Chose the correct combination of require integration and the area ОА dydx = 10 square unit 7 4x - 7 3 B. None of the above OC $ 523, oxo dx dy = 6 square unit 4 7 + 3y dx dy = 9 square unit ОЕ .7 4X-7 3 dydx = 9 square unit 3
السلال في The Area of a triangle with vertex (4,3), (4, -3) and (7,-3) can be obtained through double integration Chose the correct combination of require integration and the area None of the above AO -2x +11 dydx = 10 square unit BO -2x +11 dydx = 12 square unit 11-y DO dx dy = 11 square unit 11-y ΕΟ 2 dx dy= 9 square unit
The Area of a triangle with vertex (4,3), (7,3) and (7, 7) can be obtained through double integration. Chose the correct combination of require integration and the area OA 7 7 Sy S7+3; dx dy= 10 square unit 4 B. 7 4x-7 3 Li dydx = 10 square unit 4 3 $, 57431 dx dy = 9 square unit 4 OD 4x-7 3 dydx = 6 square unit O E. None of the above
only final answer , no explaining required
Question 13 Find the equation of the plane tangent to f(x,y) = 5x²-27*-47-15 at the point (1, - 2) X+ Answer: 9 conds. 7 Question 14 8 9 10 11 15 12 12 A Moving to another question will save this response. R 1 15 n -3 Evaluate the double integral: SS (3x - 5y) da, n , where R ={(x,y)| – 15xs2 and Osys 1). Moving to another question will save this...
/4 Question An area of square, drea ofa rectangle and triangle can be calculated by using the given formula: sqareaa (renww value from the functioi area is reciabgle-(retrn valwe from the function is area int) ceouatre -D-(return value fromtheneion e s double t and s s formula must be use when the values for the sides of the triangle are whether you want to calculate the area of square or a. b and c are the sides of the triangle...
Chapter 11, Review Exercises, Question 015 (a) Find the area of the triangle with vertices A (6,4,3), B (4,6,4), and C(11,9, 1). Enter the exact answer. Area = Edit (b) Use the result in part (a) to find the length of the altitude from vertex C to side AB. Enter the exact answer. Length ? Edit Chapter 11, Review Exercises, Question 017 Consider the points A(3,-3,2), B(4, -5,0), C(-1,-4,0), D (6,2, -3) (a) Find the volume of the parallelepiped that...
need help with #8 and #13.
w praxe ved at the way from the w orse variables so that it to the positive text 8.6. Excercists sin 231 charged surface, S, of charge density p, the electrostatic po- cos 6. Given a charger social at & point (a,b,c) not on S is , %* wwward with vertex , 2 =2 2r m. s (-a)? + (y - 3)2+(2-cz. s is the cylindrical surface 3* + y = 4,03% ant find...
please anyone answer all the questions as soon please
2 4 3 3 4 1. Given three points A = (0,–8, 10), B = (2, -5, 11), C = (-4,-9, 7) in R3. (a) Show that these three points are not collinear (not in a straight line). (b) Find the area of the triangle ABC. (c) Find the scalar equation of the plane containing the points A, B and C. (d) Find a point D on the plane such that...
Recall the definition of the degree of a vertex in a graph. a)
Suppose a graph has 7 vertices, each of degree 2 or 3. Is the graph
necessarily connected ?
b) Now the graph has 7 vertices, each degree 3 or 4. Is it
necessarily connected?
My professor gave an example in class. He said triangle and a
square are graph which are not connected yet each vertex has degree
2.
(Paul Zeitz, The Art and Craft of Problem...
Q1.
Q2.
Q3.
Q4.
Question 4 (2 marks) Attempt 1 A surface is described by the equation re10y+9y For a surface defined by a vector R(t,y)y,z(ry), the element of surface area is given by dS For the given surface, determine the cross product Each component should be expressed using the correct Maple syntax; for example, one component might be: -31+7'x exp(-11 y) The first component of the cross product is The second component of the cross product is The third...
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