A cubical shape wooden box has a side length of 15 inches. this box is filled with small balls, 1 inch in diameter. What a maximum number of balls that can fit in this box? determine the ratio of the total volume of balls in the box?
A cubical shape wooden box has a side length of 15 inches. this box is filled...
A cylindrical piece of steel has a diameter of 50 mm and a length of 200 mm. Steel has a density of 7200 kg/m3 a) (3 points) Determine the mass of this piece in kg. 1. b) (3 points) If a 10 mm diameter opening is drilled through the entire length of this cylinder and that portion removed, what is the new mass of this piece? c) (4 points) The 10 mm diameter piece is pulled with a force of...
Assume that liver cells are cuboidal in shape, with a side length of 23.0 μm. i) How many liver cells would fit across a pinhead with a diameter of 0.500 mm? Number of cells = cells ii) What is the volume of a liver cell? Volume of cell = μm3
A box currently has length and width of 10 inches and a height of 3 inches. Use calculus to determine at what rate the height changes, if the length and width are decreasing at a rate of 2 inches per minute and the volume of the box is constant. (6 points)
(1) A box has a height of 6 inches, a width of 4 inches, and a length of 10 inches (and therefore a volume of 240 cubic inches). The height is decreasing at a rate of 0.5 inches per minute, the width is increasing at a rate of 2 inches per minute, and the length is increasing at a rate of 1 inch per minute. At what rate is the volume changing? Car A travels East towards the intersection of...
A long, straight wire, carrying a current of 200 A, runs through a cubical wooden box, entering and leaving through holes in the centers of opposite faces (see the figure (Figure 1) ). The length of each side of the box is 20.0 cm. Consider an element dl of the wire 0.100 cm long at the center of the box. (Note: Assume that dl is small in comparison to the distances from the current element to the points where the...
The Box Problem Take an 8% x 11 sheet of paper and cut out 4 congruent squares (one from each corner) as shown below on the left. This creates a net for an open-topped box (rectangular prism) which can be folded up as shown on the right. We're going to use our box to carry as many M & M's as possible. If the side-length of each cut-out square is 1 inch, then the box created will have dimensions 1...
An open box is made from a square piece of cardboard 20 inches on a side by cutting identical squares from the corners and turning up the sides.(a) Express the volume of the box, V , as a function of the length of the side of the square cut from each corner, x. (b) Find and interpret V (1),V (2),V (3),V (4), and V (5). What is happening to the volume of the box as the length of the side...
1. [ball_filler.py] You have been contracted by a bowling ball manufacturer to write a program that estimates the amount of ball "filler they will need to order for a new line of bowling balls. Each spherical bowling ball has a diameter that can vary from 8.4 to 8.6 inches. Inside that all there are two things: (1) a uniquely shaped metal object called the core that affects the spin of the ball, and (2) stuff packed around the core making...
T. 0.875 inch, find W. side diameter of the bearing? Or- dowolto pscort on sanwa BELOON zo snblov 008-09 0.632 June ronto 3.202 1999 loco odbi 0.212 120 1919 14. If A = 0.375 inch, B = 0.923 inch, and C= 1.0992 inches, find G. 15. If x = 0.9375 inch and Y= 16.) The inside diameter of a motor shaft bearing is 0.0075 centimeter wider than the shaft. The shaft diameter is 4.75 centimeters. What is the in- 28...
A closed box has a square base with side length / feet and heighth feet. Given that the volume of the box is 34 cubic feet, express the surface area of the box in terms of I only S(I) = 2136 S-21361 (1) - 22. 136 (0 - 6 none of the above