Torsional Moment - Part 3

[b]M[/b] (Torsional Moment), [b]F[/b] (Force), [b]R[/b] (Distance between the Point of Rotation and the Point of Force), [b]α[/b] (Angle between R and F) [b]In Torsional Moment - Part 2[/b] We found out that M, F and R have a linear correlation. We found out that the formula which [math]\alpha[/math] contains is [math]M = R \cdot F \cdot sin(\alpha) [/math] [Nm]

[b]Task 1:[/b] Fix [math]F_1[/math] and [math]F_2[/math] at the same value and find out how M depends on the directions of [math]R_1[/math] and [math]R_2[/math] [b]Task 2:[/b] Fix[math] R_1[/math] and [math]R_2[/math] at the same value and find out how M depends on the directions of [math]F_1[/math] and [math]F_2[/math] [math]Task 3:[/math] Write a mnemotechnic verse in your exercise book on the subject of the Torsional Moment. Use the internet to expand your knowledge about this issue.

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