Reference no: EM131005853
1. Find the equation of the plane that contains the point P (2,4,6) and the line
x = 7 - 3t, y = 3 + 4t, z = 5 + 2t.
2. Find the equation of the line passing through the points P (3,5,7) and Q (6,5,4).
3. Given a position vector
r(t) = [t, t2, t3]
Find the velocity and acceleration vectors and the speed at time t.
4. Find the shortest distance from the point (2,5,7) to the line
x(t) = 6 - 2t, y(t) = 4 + 5t, z(t) = 4 + t.
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Exponential distribution with rate
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Determine the distance between the point and the line
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Determine the velocity and acceleration vectors
: Given a position vector r(t) = [t, t2, t3], Find the velocity and acceleration vectors and the speed at time t. Find the equation of the line passing through the points P (3,5,7) and Q (6,5,4).
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: (a) What is the distribution of the number of failures by time t? (b) What is the distribution of the number of ?aws that remain in the system at time t? (c) Are the random variables in parts (a) and (b) dependent or independent?
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