The Relevant Equations are indeed the projectile motion equations.Googlu02 said:
i think one should specify the initial position of the grasshopper first to ask the question...its very similar to a high jump in atheletics and the choice of initial position determines the possible angle of projection so that he can scrape/clear the height. and the horizontal range and vertical distance gets related through angle of projection...Googlu02 said:
The initial position is one of the variables in the optimization equation...drvrm said:
Now show us some of the equations for the parabolic path of the grasshopper, and how they depend on Vo...Googlu02 said:
Googlu02 said:
Googlu02 said:
That is not immediately clear, and this is precisely Googlu02's issue. Perhaps clearing a height of 2R is not enough. And if it is not, 45 degrees might not be the ideal launch angle.ehild said:
There is no basis for assuming that.dykuma said:
haruspex said:
Maybe, but you do not know that yet.Googlu02 said:
What do you mean by that? It sounds like you are saying that as it scrapes the log the tangent there will be 45 degrees. Perhaps you mean you can assume the launch angle is 45 degrees. Unless you have left something out of the original problem statemennt, neither is necessarily true.Googlu02 said:
No, it (the radius of curvature of the parabola) must be greater than or equal to that of the log.ehild said:
I meant, when the bug just scrapes the log.haruspex said:
Sure, but the curvatures do not have to be equal. It is only necessary that i) the parabola and circle are tangential at that point and ii) the curvature of the parabola there is greater than or equal to that of the circle.ehild said:
The speed needed to reach the top of the circle decreases with increasing angle and it reaches the minimum value at 90°, But the parabola must be over the circle, and touching it at the top. That means a limit for the angle of the jump. We get the maximum angle (and minimum speed) when the second derivatives of the circle and parabola are equal at the top of the curves.haruspex said:
Quite so, but that is the key argument for solving the problem of minimisation. In the post I objected to (#15) you appeared to be saying that equality of curvatures was a direct consequence of just touching the top of the log and nowhere else. No mention of minimisation there.ehild said:
The minimum velocity required by a grasshopper to jump varies depending on the species and size of the grasshopper. However, on average, grasshoppers need a velocity of about 8.5 miles per hour (13.7 kilometers per hour) to jump.
The minimum velocity required by a grasshopper is relatively high compared to other insects. For example, fleas can jump at a velocity of over 200 times their body length, while grasshoppers can only jump about 20 times their body length. This is because grasshoppers have heavier bodies and shorter hind legs compared to other jumping insects.
The minimum velocity required by a grasshopper is affected by several factors including the species and size of the grasshopper, the surface it is jumping from, and the force of its leg muscles. Grasshoppers also tend to jump higher and further in warmer temperatures, so temperature can also play a role in the required velocity.
Yes, the higher the velocity, the higher and further a grasshopper can jump. This is because a higher velocity provides more force and momentum to overcome the weight of the grasshopper and the resistance of the air.
Scientists typically measure the minimum velocity required by grasshoppers by conducting experiments in a controlled environment. This involves placing a grasshopper on a flat surface and measuring the distance and height of its jumps at different velocities. The data collected is then used to determine the minimum velocity required by the grasshopper to jump.