Answer:
766
Step-by-step explanation:
Answer:
1.5
1.5
Step-by-step explanation:
The steps are in the image above
The volume of the <em>oblate</em> spheroid is approximately equal to 75.398 cubic feet.
<h3>What is the volume of an oblate spheroid?</h3>
In this problem we have the shape of an ellipse centered at origin, whose vertex form is shown below:
x² / a² + y² / b² = 1 (1)
Where a, b are the lengths of the semiaxes, in feet.
An <em>oblate</em> spheroid is generated by revolving half of the ellipse about the y-axis. <em>Oblate</em> spheroids are a kind of ellipse:
x² / a² + y² / b² + z² / a² = 1 (2)
Where a, b, c are the lengths of the semiaxes, in feet.
And the volume of the <em>oblate</em> spheroid is:
V = (4 / 3) · π · a² · b (3)
If we know that a = 3 ft, b = 2 ft, then the volume of the oblate spheroid is:
V = (4 / 3) · π · (3 ft)² · (2 ft)
V ≈ 75.398 ft³
The volume of the <em>oblate</em> spheroid is approximately equal to 75.398 cubic feet.
To learn more on oblate spheroids: brainly.com/question/17585663
#SPJ1
Answer:
A E F
Step-by-step explanation:
I just did it on a calculator and saw if was a recurring