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Need Help In Engineering Math Question
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For more on marking an answer as the "Best Answer", please visit our FAQ.A boiler tank has the form of a circular cylinder of internal radius r, topped by a hemisphere as shown below
Show that the internal surface Area, A is given as:
A=2πrh + 3πr²
and the Volume is given as:
V=πr²h + 2/3πr^3
Derive a function A = f(r) relating the value of A to the value of r for tanks with capacity (volume) 0.15m^3 .
Using the derived function, complete the table in the next slide.
(Still need to see the table on the reddit page for the rest)
Show that the internal surface Area, A is given as:
A=2πrh + 3πr²
and the Volume is given as:
V=πr²h + 2/3πr^3
Derive a function A = f(r) relating the value of A to the value of r for tanks with capacity (volume) 0.15m^3 .
Using the derived function, complete the table in the next slide.
(Still need to see the table on the reddit page for the rest)
I'm concerned that there appears to be typo in the question (unless it's just that my brain isn't functioning properly in this heat).
Imagine the interior of the cylinder being lined with paper and then opening that piece of paper to form a rectangle. The area of the paper will be the same as the internal area of the cylinder. It's height will be h and it's width will be the circumference of the cylinder (2πr), so the internal area of the cylinder will be 2πrh.
The internal area of the hemisphere will, unsurprisingly, be half the internal area of the full sphere (which you're told is 4πr²). So the internal area of the hemisphere must be 2πr².
Summing the two terms gives A=2πrh + 2πr² (and NOT A=2πrh + 3πr², as given in the question).
So either my brain isn't functioning properly (which is quite likely!) or there's a typo. Perhaps someone else here would care to comment?
Imagine the interior of the cylinder being lined with paper and then opening that piece of paper to form a rectangle. The area of the paper will be the same as the internal area of the cylinder. It's height will be h and it's width will be the circumference of the cylinder (2πr), so the internal area of the cylinder will be 2πrh.
The internal area of the hemisphere will, unsurprisingly, be half the internal area of the full sphere (which you're told is 4πr²). So the internal area of the hemisphere must be 2πr².
Summing the two terms gives A=2πrh + 2πr² (and NOT A=2πrh + 3πr², as given in the question).
So either my brain isn't functioning properly (which is quite likely!) or there's a typo. Perhaps someone else here would care to comment?
Thanks, IJKLM.
I'm just being thick, as usual!
Yes, adding in the area of the base (πr²) gives
A=2πrh + 2πr² + πr² = 2πrh + 3πr²
The volume of the cylinder is equal to the area of its base (πr²) multiplied by its height (h).
The volume of the hemisphere is equal to half the volume of the full sphere.
Thus V=πr²h + 2/3πr^3
Then substitute 0.15for V and the fun really starts ;-)
(Remember that, because you're seeking A as a function solely of the radius, h needs to be regarded as a constant)
I'm just being thick, as usual!
Yes, adding in the area of the base (πr²) gives
A=2πrh + 2πr² + πr² = 2πrh + 3πr²
The volume of the cylinder is equal to the area of its base (πr²) multiplied by its height (h).
The volume of the hemisphere is equal to half the volume of the full sphere.
Thus V=πr²h + 2/3πr^3
Then substitute 0.15for V and the fun really starts ;-)
(Remember that, because you're seeking A as a function solely of the radius, h needs to be regarded as a constant)
For those interested in mathematics they would love the film The man who knew infinity.
https:/ /en.wik ipedia. org/wik i/The_M an_Who_ Knew_In finity_ (film)
About the mathematical genius Srinivasa Ramanujan and the prejudice he faced when he came to England.
https:/ /en.wik ipedia. org/wik i/Srini vasa_Ra manujan
https:/
About the mathematical genius Srinivasa Ramanujan and the prejudice he faced when he came to England.
https:/
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