ons If the height of the stored product is greater than the height of the conical section, the equation for a cylinder must be added to the volume of the cone: 1 V==TR²hcone + TR² (h-hcone) 3 if h> hcone (4.13) If the height of the conical section is 3 meters, the radius of the cylindrical section is 2 m, and the total height of the storage bin is 10 meters, what is the maximum volume of material that can be stored?
ons If the height of the stored product is greater than the height of the conical section, the equation for a cylinder must be added to the volume of the cone: 1 V==TR²hcone + TR² (h-hcone) 3 if h> hcone (4.13) If the height of the conical section is 3 meters, the radius of the cylindrical section is 2 m, and the total height of the storage bin is 10 meters, what is the maximum volume of material that can be stored?
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Can you help me solve this problem please , and show me the formulas and the steps in excel please

Transcribed Image Text:ons
If the height of the stored product is greater than the height of the conical section,
the equation for a cylinder must be added to the volume of the cone:
if h> h cone
(4.13)
If the height of the conical section is 3 meters, the radius of the cylindrical section
is 2 m, and the total height of the storage bin is 10 meters, what is the maximum
volume of material that can be stored?
1
V==TR²hcone
v==TR²h cone
+ TR²(h-hcone)
4.9 Finding the Volume of a Storage Bin II
er the storage bin described in the previous problem.

Transcribed Image Text:a. the angle between the horizontal and wire C.
b. the tension in wire C.
Figure 4.60
Storage silo.
How does the angle in part (a) change if the tension in wire B is increased to
3000 N?
4.8 Finding the Volume of a Storage Bin I
Excel
A fairly common shape for a dry-solids storage bin is a cylindrical silo with a conical
Functions collecting section at the base where the product is removed (see Figure 4.60.)
hcone
R
To calculate the volume of the contents, you use the formula for a cone, as long as
the height of product, h, is less than the height of the conical section, hone:
V=- th
ifh <hcone
(4.11)
Here, Th, is the radius at height h and can be calculated from h by using trigonometry:
Th=
h = h cone tan (0).
(4.12)
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