About 433.526 inches^3
Answer 2
Authors, Matthew McKay Stephens, Tim Jacobs, Mike Dunning
Goal: Calculate the volume of a Basketball as accurately as possible. Objective 1: Calculate the volume of a basketball. Step One: Find the radius of the basket ball inflated at 8 PSI. To do this we used a string to measure the circumference of the basket ball arriving at a measurement of 29 inches. Next we inserted that number into the formula C = 2πR where C= circumference and R= Radius. We found that where C= 29inches, R= 4.615 inches. Step Two: Graph a circle like the one to the right using the radius calculated in step one. To do this we took the formula X²+Y²=R² and inserted our value for the radius arriving at the equation Y=± √21.29-X². Step Three: Set up an equation to calculate the Volume of the sphere. To do this we used the disc method where V=π ∫(f(x))²-(g(x))² and entered the positive value of our circle as f(x) and Y=0 as our g(x). We also decided to bound our equation by 0 and 4.615 thereby only using quadrant I of our graph as indicated in the second picture to the right. This However would only give us half of the value of the sphere so we multiplied the entire equation by 2. Bearing all of this in mind we arrived at the equation V=2π∫ [(√21.29-X²)²-(0)²]. Step Four: Plug and Chug (solve the equation) V=2π∫[ (√21.29-X²)²-(0)²] V=2π∫ [21.29-X²] V=2π[(21.29X-(1/3)X³) bounded by 0, 4.615] V=2π (98.25-32.76) V=2π(65.53) V=411.74 inch³ Objective 2: Increase accuracy of measurements by calculating for areas of diminished volume i.e. the sunken black lines wrapping around the ball. Noting that the circumference of one black line wrapping around the ball is 28 ½ inches verses the original circumference of the sphere which was 29 inches. Step one: Measurement and observation We used a string and determined there was 109 inches of ¼ inch thick black space wrapping around the ball. Step Two: Calculate the Radius of a circle with a circumference of 28 ½ inches To do this we again used the formula C = 2πR where C= circumference and R= Radius. We found that where C= 28 ½ inches, R= 4.536 inches. Step Three: Set up an equation to calculate the volume of two ¼ inch thick discs, where one has a radius of 28 ½ inches and the other a radius 29 inches. To do this we first assumed the function of each Cartesian graph would be simply Y=X where X is the value of the radius of the disc being calculated. We then used the disc method where V=π∫(f(x))²-(g(x))² and entered the radius of the disc being calculated as our value for f(x) and 0 as our value for g(x). Lastly we bounded the equations by X= 0, ¼ Step Four: Plug and Chug (solve the equations) Disc (1) 28 ½ inch circumference V=π∫[(4.536)²-(0)²] V=π∫[20.575] V= π[(20.5750(X), bound by 0, ¼ ] V= π(5.14) V= 16.160 inches³ Disc (2) 29 inch circumference V=π∫[(4.615)²-(0)²] V=π∫[21.303] V= π[(21.303(X), bound by 0, ¼ ] V= π(5.623) V= 16.713 inches³ Step Five: Take the difference of the two volumes 16.160-16.731= -.571 inches³ Step Six: Divide the difference by 28 ½ inches to determine the amount of volume lost per inch of black line. -.571/(28 ½ )= -.0200408208 Step Seven: Multiply amount per inch by total inches of black line. -.0200408208*109= -2.184 inches³ Step Eight: Add that value to the previous total volume to determine a more accurate volume that has been adjusted for areas of diminished volume. 411.74-2.184= 409.556 inches³
it's a 678686868
Improved Answer:-
Volume of a ball or sphere = 4/3*pi*radius3
There is not a single size for a basketball. Even the official NBA ball can have a circumference between 24.1 cm and 25.0 cm. This implies a volume of between 236.4 and 263.9 cubic centimetres (or millilitres).
Everything has volume, solids and liquids, even gases. The actual volume of a volleyball depends on how much air is put into it, but a good estimate of the volume of a volleyball is 321.54 in³.
The National Basketball Association allows only one official ball: The ball must be the official NBA game ball manufactured by Spalding. The ball is orange in colour, 29.5 (749 mm) inches in circumference and weighs 22 ounces (624 g) (size 7). It must also be inflated to between 7.5 and 8.5 pounds per square inch.
-we find that the Baseball "is generally approximately 9 inches ... in circumference." It can be a little bigger.
It comes out to be about 12.31 cubic inches.
I really do not know, but I know that a basketball is shape as a sphere so use the volume of sphere.
Circumference of soccer ball = 0.6858m
2*pi*r = 0.6858
r=0.109m
V=(4/3)*pi*(0.109)^3
V=0.005425m^3
you weigh it
If you are asking about encyclopedias, it would be in the B volume.
No
No. A sphere has the smallest surface to volume ratio possible and a basketball is nearly spherical in shape (it has surface dimpling and seams).
find the volume of the basketball using the formula 4/3 * phi * radius3since the volume of the mercury inside the basketball equals the volume of the basketball, find the weight by calculang density (13.6) * the basketball's volumemake sure you do the calculations in the correct measurement
Volume=4/3(pi)r3
The volume formula is: 4/3 times pi times radius cubed
TOM CRAPPER LIVING STONE
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Diameter, mass, weight, hardness, volume, pressure.
Volume is defined as the amount of space that a substance or object occupies, or that is enclosed within a container. An example of volume is how a Bowling ball and Basketball are about the same size and take up the same amount of space, therefor they have the same, or similar, volume.
If the basketball is regarded as a perfect sphere then the formula for the volume (V) is V = 4/3πr3 where r is the radius. If the radius is 5 inches then V = 4/3π53 = 500/3π = 523.60 cubic inches (2dp)
Volume of a sphere: 4/3*pi*radius^3 in cubic units