Answer:
(a) Distance from the point (-4, -1, -3) to the xy-plane is 3.
(b) Distance from the point (-4, -1, -3) to the yz-plane is 4.
(c) Distance from the point (-4, -1, -3) to the xz-plane is 1.
Step-by-step explanation:
If a point is defined as P(x,y,z), then the distance of point P,
1. From xy-plane = |z|
2. From yz-plane = |x|
3. From xz-plane = |y|
The given point is (-4, -1, -3). Here, x=-4, y=-1 and z=-3.
Distance from the point (-4, -1, -3) to the xy-plane is
[tex]|z|=|-3|=3[/tex]
Distance from the point (-4, -1, -3) to the yz-plane is
[tex]|x|=|-4|=4[/tex]
Distance from the point (-4, -1, -3) to the xz-plane is
[tex]|y|=|-1|=1[/tex]
Answer:
a). Distance from x-y plane = 3 units.
b). Distance from y-z plane = 4 units.
c). Distance from x-z plane = 1 unit.
Step-by-step explanation:
Coordinates of a point have been given as (-4, -1, -3).
Polar coordinates of any point represent the its distance from every individual plane (y-z plane, x-z plane, x-y plane).
Now we can find
a). Distance of the point from x-y plane will be the value of z-coordinate
= 3 units
b). Distance of this point from y-z plane = x coordinate
= 4 units
c). Distance of the point from x-z plane = y coordinate
= 1 unit.
