144pi units^2
144pi units squared
23
A straight line 4 units below and parallel to the x-axis
The length of the major axis of an ellipse is determined by the lengths of its semi-major and semi-minor axes. In this case, if the red line segment represents the semi-major axis (8), the length of the major axis would be twice that, which is 16. The blue line segment, being shorter (4), represents the semi-minor axis. Thus, the major axis of the ellipse is 16 units long.
(x+14)2 + (y+10)2 = 1 62 82
The answer is given below.
144pi units squared
144pi units2
By axis if you mean its diameter then surface area: 4*pi*8^2 = 256*pi square units
There are no images so it is impossible to tell how the dimensions of the sphere and square are related.
On a horizontal straight line, three units below the x axis. On a horizontal straight line, three units below the x axis. On a horizontal straight line, three units below the x axis. On a horizontal straight line, three units below the x axis.
23
A straight line 4 units below and parallel to the x-axis
a sphere
y=-6 is a horizontal line 6 units BELOW the x-axis.
The length of the major axis of an ellipse is determined by the lengths of its semi-major and semi-minor axes. In this case, if the red line segment represents the semi-major axis (8), the length of the major axis would be twice that, which is 16. The blue line segment, being shorter (4), represents the semi-minor axis. Thus, the major axis of the ellipse is 16 units long.
(x+14)2 + (y+10)2 = 1 62 82