PROJECTILE PASCO CAPSTONE HOW TO
Learn how to use the Smart Ballistic Cart Accessory to demonstrate the independence of X and.
We confined the values for A and B, and this would be our answer for B. Dan Burns goes over PASCOs Smart Ballistic Cart Accessory.
PROJECTILE PASCO CAPSTONE PLUS
So relating these two to our, um, standard form essentially y equals X plus B X squared. This would be squared because of this entire term is squared. So this would be equaling a, uh and then be is equaling negative g over to be ex initial squared. The initial sign of fada over the initial co sign of data, which is equaling tangent of data Where needs to cancel out. Why initial over the ex initial, which is actually gonna be equaling two.
And as you can see, this is in the form y equals a times X plus B x squared and then here a relating these two equations A is gonna be equaling V. the Smart Ballistic Accessory can launch the projectile based on measurements made by the Smart Cart in either Sparkvue or PASCO Capstone software. Why initial over the ex initial Times X and then minus G. So why is gonna be equaling the why initial multiplied by X divided by the ex initial minus 1/2 G multiplied by X over the ex initial quantity squared. And so we can say that G in this case is gonna be negative so we can account for this and say negative 1/2 gt squared and we can then substitute in tea. And so we can then say that the change in why or simply why is equaling v y initial t plus 1/2 g t squared. So the exposition divided by V x initial. And so that t equals simply X divided by v x initial.
You can say that the displacement in the extraction is gonna be equaling the initial velocity in the extraction multiplied by T we're going to then solve for tea.
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