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The area of a rectangular poster is calculated using the formula ( \text{Area} = \text{length} \times \text{width} ). Since the poster is square with both dimensions measuring ( w ), the area can be expressed as ( w^2 = 5400 , \text{cm}^2 ). To find ( w ), take the square root of both sides: ( w = \sqrt{5400} ). Thus, ( w \approx 73.48 , \text{cm} ).
To find the output, we can calculate the power exerted by Anna while climbing the stairs. Power is given by the formula ( P = \frac{W}{t} ), where ( W ) is the work done and ( t ) is the time taken. The work done (W) can be calculated as ( W = \text{force} \times \text{distance} = 565 , \text{N} \times 3.25 , \text{m} = 1833.75 , \text{J} ). Therefore, the power output is ( P = \frac{1833.75 , \text{J}}{12.6 , \text{s}} \approx 145.2 , \text{W} ).
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If the sum of a number and ( w ) is represented as ( \text{number} + w ), then to find the number, you would rearrange the equation to isolate the number. Thus, the number can be expressed as ( \text{number} = \text{sum} - w ), where "sum" represents the total value. Without a specific value for the sum, we cannot determine the exact number.
W. J. McLaughlin has written: 'The diary of a Utah girl' -- subject(s): Fiction
Power is calculated using the formula ( P = \frac{W}{t} ), where ( P ) is power, ( W ) is work, and ( t ) is time. In this case, ( W = 180 , \text{J} ) and ( t = 2.4 , \text{s} ). Plugging in the values, ( P = \frac{180 , \text{J}}{2.4 , \text{s}} = 75 , \text{W} ). Therefore, the required power is 75 watts.
Louis W. Kaufmann has written: 'Auxiliarium ministeriale, being a manual diary of ministerial acts'
Power is calculated using the formula ( P = \frac{W}{t} ), where ( W ) is the work done and ( t ) is the time taken. The work done ( W ) is equal to the weight lifted (force due to gravity) multiplied by the height, ( W = mgh ). For a weightlifter lifting 140 kg to a height of 1.5 m, the work done is ( W = 140 , \text{kg} \times 9.81 , \text{m/s}^2 \times 1.5 , \text{m} = 2058.15 , \text{J} ). Thus, the power used is ( P = \frac{2058.15 , \text{J}}{10 , \text{s}} = 205.82 , \text{W} ).
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To define the color of the text w/ CSS, it is {color:[color of text];} Ex.: body{color:#0000ff;}