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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 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...