Find an equation of the sphere with center (2, −6, 4) and radius 5. Use an...

Find an equation of the sphere with center (−4, 4, 5) and radius 6. What is...

Find an equation of the sphere with center (−4, 4, 5) and radius 6. What is the intersection of this sphere with the yz-plane? , x = 0

(a) Find parametric equations for the line through (2, 2, 6) that is perpendicular to the...

(a) Find parametric equations for the line through (2, 2, 6) that is perpendicular to the plane x − y + 3z = 7. (Use the parameter t.) (x(t), y(t), z(t)) =    (b) In what points does this line intersect the coordinate planes? xy-plane     (x, y, z) =    yz-plane     (x, y, z) =    xz-plane     (x, y, z) =   

Consider the line which passes through the point P(4, 5, 4), and which is parallel to...

Consider the line which passes through the point P(4, 5, 4), and which is parallel to the line x=1+3t, y=2+6t, z=3+1t Find the point of intersection of this new line with each of the coordinate planes: xy-plane: ( , ,  ) xz-plane: ( , ,  ) yz-plane: ( , ,  )

Find parametric equations for the line through (1, 1, 6) that is perpendicular to the plane...

Find parametric equations for the line through (1, 1, 6) that is perpendicular to the plane x − y + 3z = 8. (Use the parameter t.) (x(t), y(t), z(t)) = 1+t, 1-t, 6+3t Correct: Your answer is correct. (b) In what points does this line intersect the coordinate planes? xy-plane (x, y, z) = yz-plane (x, y, z) = xz-plane (x, y, z) =

Find the equation of the sphere with center in the xz- plane and passing through the...

Find the equation of the sphere with center in the xz- plane and passing through the points (0,8,0), (4,6,2), (0,12,4)

Question Find the center, the radius and the equation of a sphere if one its diameters...

Question Find the center, the radius and the equation of a sphere if one its diameters has endpoints (2,1,4) and (4,3,8).

A) Show that the equation represents a sphere, find its center and radius: x2+y2+z2-2x-4y+8z=15 B) Find...

A) Show that the equation represents a sphere, find its center and radius: x2+y2+z2-2x-4y+8z=15 B) Find the equation of the sphere if one of its diameters is between the points (2,0,0) and (0,6,0) C) Describe in words or with a drawing the region represented by x2+y2=9, z= -2 D) Find the length of the sides of the triangle that passes through the following points and determine if it is a rectangle, isosceles, equilateral: (5,3,4), (7,1,3), (3,5,3)

Find the angle between the planes 15x−25y+z=−18 and 9x+3y+19z=−6. Round to the nearest degree, and do...

Find the angle between the planes 15x−25y+z=−18 and 9x+3y+19z=−6. Round to the nearest degree, and do not include the degree symbol in your answer. Find the parametric equations for the line segment between the points P(−3,5,9) and Q=(4,−7,2) so that the line segment extends from P at t=0 to Q at t=1. Enter the three coordinate equations in the form x=f(t), y=g(t), z=h(t). Find an equation of the sphere that has center C(2,4,5) and is tangent to the xy-plane. Find...

Show that the equation represents a sphere, and find its center and radius.4x2+ 4y2+ 24x+ 4z2−20y=−57...

Show that the equation represents a sphere, and find its center and radius.4x2+ 4y2+ 24x+ 4z2−20y=−57 + 16z. Find a unit vector that has the same direction as the vector 3a−2b given that a= 2i+k and b=i−j+ 3k. Find a vector b with |b|= 5 such that the angle between the vector a=〈0,2〉and the vector b is π/3.(Hint: cos(π/3) =12).

Given two planes in space: 2? − ? + 6? = −4 and 5? + 3?...

Given two planes in space: 2? − ? + 6? = −4 and 5? + 3? − ? = 4. Find the angle between these two planes and the symmetric equations of the line of intersection of these two planes.