A truck driver’s gas gauge is broken. He knows he has a 150 gallon cylindrical tank. He takes a stick and inserts into the tank and measures that it was 1/3 high. If he drives 60mph and gets 20 mpg at that speed, how many miles can he travel?
How a simple class 10 question of maths can be converted into Bsc.1st year complex question just by changing the orientation of cyclinder, that is from vertical to horizontal 😂😂
You have to subtract the areas of the triangle from the sector. Numerically, you may also subtract from pi*L*r^2 the previous result (but change h with 2r-h)
Very nice explanation! I just used the formula to calculate the amount of refrigerant in the receiving tank of a chiller.
Wow. thank you i needed this to translate a pressure sensor into actual water volume of my water recycling tank. I would not have reached this point.
A truck driver’s gas gauge is broken. He knows he has a 150 gallon cylindrical tank. He takes a stick and inserts into the tank and measures that it was 1/3 high. If he drives 60mph and gets 20 mpg at that speed, how many miles can he travel?
Very good explanation
How a simple class 10 question of maths can be converted into Bsc.1st year complex question just by changing the orientation of cyclinder, that is from vertical to horizontal 😂😂
How to calculate the height of a cylindrical tank with hemi or torisphere edge
How to solve this equation if Volume radius and other values are known and we need to find height
What is the volume of water in terms of h only
How could u neglecting pi with another pi in area of the sector !!!
ty sir
If the water is under the line of the center what i do.
You have to subtract the areas of the triangle from the sector.
Numerically, you may also subtract from pi*L*r^2 the previous result (but change h with 2r-h)
The formula is 1/2(πrl)
Nice
👍
How could u neglecting pi in area of sector and that was in rad. With pi in the area of circle?!!
that is what happens when you are in radian. Pi will be cancelled or cross themselves out of the formula