QUESTION 3 The circle of radius 4 centered at the point (9,-2, 1) and lying in a plane perpendicular to the x-axis has equation OA Ou (z - 1)2 + (9-0)2 = 42, z = -10 Ос 3)+()= 4?, x=9 0° (y + 2)2 + (z - 1)2 = 4*, x = 9 05. (y + 2)2 + (z – 1)2 = 4, y +z = -10
QUESTION 26 The circle of radius 4 centered at the point (9,-2,1) and lying in a plane perpendicular to the x-axis has equation OA (z - 1)2 + (y-0)2 = 42,2=-10 OB ** (y + 2)2 + (z - 1)2 = 42,x=9 SC_2+() 2 = 4, x = 9 100 (x + 2)2 +(2-1)2 = 42, y+z=-10 O
QUESTION 7 € The circle of radius 4 centered at the point (9,-2.1) and lying in a plane perpendicular lo the x-axis has equation O^ (z – 1)2 + (y – 0)2 = 42, z = -10 OB. (v) + (%)2 +1 = 42 OC (y + 2)2 + (z – 1)2 = 42, y+z=-10 oo + ) = 4?, =9 OE. (y + 2)2 + (z – 1)2 = 42,x=9
Consider the angle shown below with its vertex located at -2,-2). The circle centered at the angle's vertex has a radius 3 units long, and the terminal point is at (0.13, – 4.12). -6 -5 -4 -3 -2 -1 1 2 - 0.13, -4.12) What is the angle's radian measure (assuming that 0 < < 2)? o= Preview Submit License Question 13. Points possible: 1 Unlimited attempts. Message instructor about this question
Give the center and radius of the circle described by the equation and graph the equation. Use the graph to identify the relation's domain and range 12- 10- 2+y2=25 8 Use the graphing tool to graph the equation. Click to enlarge graph 2- 40 12 468 12-10 -8 What is the domain? 4 The domain is 6 (Type your answer in interval notation.) What is the range? 10 -12 The range is (Type your answer in interval notation.) Give the...
Find a parametrization of the circle of radius 4 in the xy-plane, centered at (−2,−4), oriented counterclockwise. The point (2,−4) should correspond to t=0. Use t as the parameter for all of your answers.
Write in standard form the equation of the circle with the given center and radius. Center (-4,7); r = 6 The equation of the circle is a Find the center and radius of the circle. Then graph the circle. (x - 3)2 + (y + 3)2 = 49 Use the graphing tool to graph the circle in the answer field to the right.
A point starts at the location ( -7,0) and moves CCW along a circle centered at (0,0) at a constant angular speed of 2 radians per second. Lett represent the number of seconds since the point has swept out since it started moving. Draw a diagram of this to make sure you understand the context! a. Suppose the point has traveled for 0.2 seconds (t = 0.2). How many radians would need to be swept out from the 3-o'clock position...
Find the parametric equation of a circle of radius R, centered at (x = a; y = b), using the arc length as a parameter.
3. (4 points) Compute (Z - i)?dz, where y=C3(6+i) is the circle of radius 3 centered at 6+i with positive orientation.