9. Find the volume of the region inside the sphere rº + y2 + z2 = 4 and above the plane z = -1 for y> 0. x+y* 2²=4 = pe site prostorno dp ad do okp242 te trisht 1o do do 0302 & shop do do 1o E & scos d 38 do I- $ cosŚro- to 10 -- cos įm -
r+9 tan θ Find the area of the shaded region in the accompanying 2 figure. Is the graph of r = 9 tan 0,-2 <0 < 7: asymptotic to the lines x = 9 and x =-9? 9x/4) -(912 /2) csc θ ol The area of the shaded region is (Type an exact answer, using π as needed.) is the graph of r = 9 tan 0,-2 < 0 <乏, asymptotic to the lines x-9 and x =-9? ○No O...
Find sin , cos , and tan - O A. sino= _ . cosO=- , tan 0= - 13 O B. sino= - ], COSO = 3, tan o=1/3 o c. sino=- , coso - ., tan og OD. sino - 13. COSO = 1, tan 0=13 Find the exact value of sin 510º. O B. v O A. OC. O D. Find the exact value of tan 111. OA OB. Z OD. 13 OC. 2 Suppose that there is...
(5) Find the general solution of the equation 6 – tan tan -1=2 tan . (6) Find the general solution of the equation 3 cosO + 7 cos – 6= 0. (7) Find the general solution of the equation 5 cos @ +9= 12 sinº O. (8) Find the general solution of the equation 3 sec + 3 cos + 10 = 0.
a+b Cos x If tan () Q.9 tan tan tan then find the value of 0.
3. Consider the vector field F(x,y) = (27x D = {(1,y): 0 < rº + y2 <2}. +ya) defined on the region D where a) Directly compute SF. Tds using the definition of the line integral, where C is the unit circle oriented counterclockwise. b). Use Theorem 3.3 (Test for Conservative Vector Fields) from the text to determine if F is conservative. Is your answer consistent with part a)? If not, what is the source of the discrepancy?
Directions: Find the exact value using half-angle
identities.
5. 7. COS 23 8 tan 12 9. If tan- and 2 <o<34, find cost 10. If cos- ie and <o<z,find tang 11. If cos and ><o<2r. find sing 2/14 12. If tane and z<o<* find tanza Gino Won (Al Things Abebid LLC. 2018
This diagram is a simplification of function : -(x+2)+(7+2)+(X+Y+Z) O F-X2)*(Y2)+(XYZ) F-(X+ZXY +2XX+Y+Z) P-XZXYZXX *Y+2)
4. [15 pts.] For 2y' = -tan(t)(y2 – 1) (a) find the general solution (solve for y(t)); (b) solve an initial value problem y(0) = -1/3 (state the domain of definition of the solution).
pi over 2 is not correct either
Let F(x, y, z) = z tan-(y2)i + z3 In(x2 + 2)j + zk. Find the flux of F across S, the part of the paraboloid x2 + y2 + z = 5 that lies above the plane z = 4 and is oriented upward.