QUESTION 6 Match the equation with the surface it defines. Figure 1 Figure 2 Figure 3...
For questions 12-17, match the graph with its equation. If it is a quadratic surface, give the name of the surface +3z2 = 1 12. [2] 2x2 13. [2] y 4x = 14. [2] x2-z2y 15. [2] 2z x2 4y2 16. [2] 2x22-z2 =1 17. [2] z 4y -x F For questions 12-17, match the graph with its equation. If it is a quadratic surface, give the name of the surface +3z2 = 1 12. [2] 2x2 13. [2] y...
match each equation to the corresponding graph g 1 s=4sin (20) 2 = 6 cos e 3. r= 2 cos (30) 4. = 3 - 3 cos e 5. =4 -- 2 sin
Hi need help for this Question Surface Integral Question: Given Formula Question 2 'Eand G is the surface passing through the points D.E Figure 1 shows 2 curved surfaces. S is the surface passing through the points A, B, Cand D. The equations of both su given in the figure. Determine the unit surface normal for S2 at the poi0,.s a volume directly above S2 and below S 0.5,0.5) and the D1,0,2) S2:z (1-x)(1-y) Figure 1 Equations for curves and...
3. This problem defines A = 2 6 (a) Find the eigenvalues of A. (b) Find an eigenvector for each eigenvalue. (c) Find a diagonalization of A. For the following matrices, write out a general solution of y' use complex or real forms as you prefer. Ay using eigenanalysis. You may 4. A=12 3 0-1 5. A =1-20 6 6. A=1-4-2
Question 1 Find the equation of the circle shown. 3 2 - 1 +-1 2 3 4 5 6 7 -2 -3 -4 -5 Write equation in standard form:
6. Match the following equations to the graph that represents it. [4 Points] Equation A: y = x2 + 2 Equation B: y = -x + 2 Equation C: y = (x - 2)2 Equation D: y = 2x2 y 37 Y 3 -3 3 X -3 LL 3 3 x -11 Equation: Equation: Equation: Equation: 7. Let f(x) = Vx. Write the equation for the resulting function when the following transformations are performed in order) onf (x): [3 Points]...
Question 12 (3 points) Match the quadratic equation with the form it represents. y = -5 (x – 3) (x + 1) 1. Standard Form 2. Vertex Form y= -x2 + 2x – 7 3. Intercept Form y=3(x + 2)2 - 1
Question Question 4 (2 marks) Attempt 1 A surface is described by the equation 2 =6x2+3y2. aR aR For a surface defined by a vector R(x,y)=(1,4,2(0,4)), the element of surface area is given by ds =( Jo Xāj dc dy. For the given surface, determine the cross product ƏR ƏR Jo taj Each component should be expressed using the correct Maple syntax; for example, one component might be: -31+7***exp(-11) The first component of the cross product is Skipped The second...
(1 point) Match the equations of the surface with the graphs below. D 1.y = 2 2. y' 2" +22 3.2 +2:1 = 1 4. y Note: You can click on the graphs to enlarge the images
Determine if the relation defines y as a function of x. 2 4 -3 -1 2 Yes, this relation defines y as a function of x. No, this relation does not define y as a function of x.