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What is an example of a linearly dependent set of three vectors with the property that any single vector can be removed from the set without changing the span.
A student claims that anything that can be accomplished by a translation can be accomplished by a reflection.
Two vectors are parallel provided that one is a scalar multiple of the other. Determine whether the vectors a and b are parallel, perpendicular, or neither.
The acceleration vector a (t), the initial position r0 = r (0), and the initial velocity v0 = v (0) of a particle moving in xyz- space are given.
Find the component form of the vector v that has an initial point at (1,-2,2) and a terminal point at (3,-3,0).
A 100g mass is placed at 20 degrees and a 200g mass at 120 degrees on a force table draw the vector diagram to scale using 0.2N/cm.
The equation of the plane passing through the point R(0) and parallel to both vectors N and B of part(a).
Write a plane equation for plane passing through P (1,2,3) and perpendicular to n = .
Find a vector with the following three characteristics: initial point at the origin, collinear but in the opposite direction of vector AB , length 3.
Briefly explain, which of the following are vector spaces? The set of all real symmetric 3x3 matrices.
If A and U are two subsets of a normed vector space, and U is open, show that A+U is open. Here A+U={a+u | a belongs to A and u belongs to U}.
Determine whether the given set and operations form a vector space. Give reasons.
Let V be the vector space of all functions f: R->R. Determine whether the following subsets of V form subspaces.
Check that even though =1, the angle theta_i between u and e_i tends to pi/2 as n goes to infinity.
Suppose L_1 is the line through the origin in the direction of a_1, and L_2 is the line through b in the direction of a_2.
The components of v=250i+310j represent the respective number of gallons of regular and premium gas sold.
Express the vector with initial point P and terminal point Q in component form. Show work.
Find the velocity and position vectors of a particle that has the given acceleration and the given inital velocity and positions.
Find the equation of the line passing through a point B, with position vector b relative to an origin O, which is perpendicular to and intersects.
When set at the standard position, Autopitch can throw hard balls toward a batter at an average speed of 60 mph.
If all edges of Kn (a complete graph) have been coloured red and blue, how do we show that either the red graph or the blue graph is connected?
For which values of k are the following vectors u and v orthogonal? Let u,v be orthogonal unit vectors. Prove that d(u,v) = 2^(1/2)
Let V be the vector space of all functions F : R ? R. Determine whether the following subsets of V form subspaces of V.
The subspace of P3 consisting of those polynomials in P3 whose graphs pass through the origin.
Use the triangle of forces to find the magnitudes of the tension in the rope and the normal reaction from the ramp, to the nearest newton.