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If the rod is 7/8 meters long and each piece will be 1/56 meters long, then we can set the problem up this way. 1 piece. 7/8 meters • --------------- = 7/8÷1/56 = 7/8 • 56. 1/56 meters. 7. --- x 56 = 49. 8. There will be 49 pieces, each 1/56 meters long. Upvote • 1 Downvote.
James Z. asked • 12/16/19 The linear density ρ in a rod 5 m long is 8/ sqrt(x + 4) kg/m, where x is measured in meters from one end of the rod.
The question asks how many 1/48 meter sections can be made from a 3/8 meter rod. We want to know how many times 3/8 can be divided by 1/48, or. (3/8)/ (1/48) Move the 1/48 term to the top by inverting it: (3/8) * (48/1) or (3*48)/ (1*8) We can simplify since 48/8 = 6, to give. 3*6/1 or 18. 18 sections of 1/48 meters in 3/8 meter rod.
A'(b) = -3 + (sqr3/2 + 9/8)b = 0. b = 3/(sqr3/2 + 9/8) = about 1.05 = side of the equilateral triangle. 3 sides = 3.15. leaving 8-3.15 = 4.85 for perimeter of a square with sides = 4.85/4 = 1.21. Area = 1.05^2 + (1.21)^2(sqr3/4) = 1.1+ .634 = 1.73 = minimum area. when you cut the 8 meter wire into 2 parts, one = 4.85 and the other part 3.15 m
Christopher R. asked • 04/14/21 Kareem has a rope that is 8 meters long. He cuts away a piece that is 2.67 meters long.
There are 15 meters in 1,500 centimeters. 1,500 centimeters x 1 meter/100 centimeters = 15 meters 1 meter = 100 centimeters How many meters is fifteen feet? 15 feet = 4.572 meters.
If you divide the 5m long rope into 8 pieces, each piece would be 5/8, or .625. However, this is not rounded to the nearest hundredth, so the answer is .63 because the 5 rounds to 2 up to 3.
Monica F. asked • 09/03/18 A metal rod 3/8 meters long. It will be cut into pieces that are 1/48 meters long. How many pieces will be made from the ro
The volleyball court is a rectangle 16 meters by 8 meters. We need the perimeter: 2*16 + 2*8 = 48 meters. (Two sides of length 16 and two sides of length 8).
the prism to the right has a length of 3,WIDTH OF 8, AND A HEIGHT OF 3. so 3 x 8 x 3=72 sq. in for the first rectangular prism and the other rectangualr prism to the left also has the same dimensions because the combined length of this composite is 9 in and the length of the middle and right rectangular prism are both 3in so 9-3-3=3.