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W=FD (W)ork=(F)orce*(D)istance
w x h
W/c .4/5
First define your variables and set up some equations. w= width of the rectangle. h= height. d= the diagonal. Our goal is to first solve for h and w so we can calculate perimeter. According to Pythagorean theorem, w^2 + h^2 = d^2 (we can do this because half of a rectangle is a right triangle). h^2 + w^2 = 17.55^2. Also, the length times width equals area (l x w=area). So, h x w =109.35 cm. Since you have 2 unknown variables and 2 equations, you can solve for the variables one at a time by using substitution. By manipulating the 2nd equation to isolate h, h= 109.35/w. Then, plug in your "h value" you just solved for into the 1st equation to get (109.35/w)^2 + w^2 = (17.55)^2. Simplifies to (11957.422/w^2) + w^2 = 308.0025. Manipulate and solve.
start real length L and width w calculate the area A= Lw calculate the circumference C=2(L+w) Display A and C End
I think you want to ask What does Barbiers Theorem says about a figure of constant width. Such a nice theorem establishes that if you have a compact figure C in the plane, that is closed and bounded, and C has constant width w, then the perimeter of C is "pi times w"
There is no single formula for the width of any arbitrary shape. If however, you already have two points that define that width, then you can calculate the distance between them with simple Pythagorean theorem: w = [Δx2 + Δy2 + Δz2]1/2
W=FD (W)ork=(F)orce*(D)istance
To calculate win-lose, add the wins and the losses and divide the sum into the wins to calculate percentage of wins or divide into the losses to calculate the percentage of losses: W + L = Total; W ÷ Total = W%; L ÷ Total = L%: example: 12 W + 8 L = 20; 12W ÷ 20 = .60 or 60% wins; 8L ÷ 20 = .40 or 40% losses
Suppose the width is W and the diagonal is D.Then, by Pythagoras's theorem, the length, L, is given by L = sqrt(D^2 - W^2).And then, area = L*W.
W. McCune has written: 'Automated deduction in equational logic and cubic curves' -- subject(s): Algebraic Curves, Automatic theorem proving, Curves, Algebraic
w x h
The formula you are looking for is R = W/I x I.
Weight can be calculated using the formula W=mg, where m is mass and g is gravity. Your weight on Moon is 16.5% of what you experience on Earth.
To calculate the square inches of the surface area of a box the formula is 2*w*h + 2*l*h + 2*w*l. In this equation w stands for width, l for length, and h represents height.
Power=work over time = watts(W)
W/c .4/5