rad/sec is the angular velocity of a crank whose radius is r. If it makes ^ with inner dead centre and obliquity of the connecting rod l is , the velocity v of the piston, is given by the equation

omega rad sec is the angular velocity of a crank whose...

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Examveda

A. $${\omega ^2}\left( {l\cos \varphi + {\text{r}}\sin \varphi \tan \theta } \right)$$

B. $${\omega ^2}\left( {l\sin\varphi + {\text{r}}\cos \varphi \tan \theta } \right)$$

C. $$\omega \left( {l\sin\varphi + {\text{r}}\cos \varphi \tan \theta } \right)$$

D. $${\omega ^2}\left( {l\sin\varphi - {\text{r}}\cos \theta \tan \varphi } \right)$$

Answer: Option C

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A. $${\text{T}} = \frac{{2\omega }}{{{\pi ^2}}}$$

B. $${\text{T}} = \frac{{2\pi }}{\omega }$$

C. $${\text{T}} = \frac{2}{\omega }$$

D. $${\text{T}} = \frac{\pi }{{2\omega }}$$

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A. 0.1 rad/sec

B. 1 rad/sec

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D. 100 rad/sec

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A. Always directed away from the centre, the point of reference

B. Proportional to the square of the distance from the point of reference

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A. $${{\text{P}}^2} + {{\text{Q}}^2} + 2{\text{P}}\sin \theta $$

B. $${{\text{P}}^2} + {{\text{Q}}^2} + 2{\text{PQ}}\cos \theta $$

C. $${{\text{P}}^2} + {{\text{Q}}^2} + 2{\text{PQ}}\tan \theta $$

D. $$\sqrt {{{\text{P}}^2} + {{\text{Q}}^2} + 2{\text{PQ}}\cos \theta } $$

E. $$\sqrt {{{\text{P}}^2} + {{\text{Q}}^2} + 2{\text{PQ}}\sin \theta } $$

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