Answer to Question #250338 in Other for asasasa

Question #250338

The force system shown consist of a Couple C and the 4 Forces. The resultant of this system is 500kNm counter-clockwise couple. a. What is the value of P? b. What is the value of Q? c. What is the value of C?

Expert's answer

"R_x=\\sum_iF_{xi}=0=>-\\dfrac{12}{13}Q+\\dfrac{4}{5}P+80kN=0"

"R_y=\\sum_iF_{yi}=0=>-\\dfrac{5}{13}Q+\\dfrac{3}{5}P-20kN=0"

Solving these equations simultaneously gives

"-\\dfrac{12}{13}Q+\\dfrac{4}{5}P+80kN=0"

"-\\dfrac{3}{13}Q+\\dfrac{1}{5}P=\\dfrac{5}{13}Q-\\dfrac{3}{5}P"

"Q=\\dfrac{13}{10}P"

"-\\dfrac{6}{5}P+\\dfrac{4}{5}P+80kN=0"

"P=200kN, Q=260kN"

Given that "C^{R}=500kN\\cdot m" counterclockwise, and choosing point "A" as the moment center, we have

"C^{R}=\\sum_iM_{Ai}"

"=>500kN\\cdot m=-20kN(3m)-C+80kN(4m)"

"+\\dfrac{3}{5}P(6m)+\\dfrac{4}{5}P(6m)"

Substitute "P=200kN"

"C=-500kN\\cdot m-60kN\\cdot m+320kN\\cdot m"

"+1920kN\\cdot m"

"C=1680kN\\cdot m"

Because the values for "P, Q," and "C" are positive, each force acts in the direction shown in the figure.

"P=200kN, Q=260kN"

"C=1680kN\\cdot m"

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Answer to Question #250338 in Other for asasasa

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