Let M be the matrix of the reflection about the plane Π passing through (0,0,0) and...

Find an equation for the plane passing through the point (4,−2,−1) that is perpendicular to the...

Find an equation for the plane passing through the point (4,−2,−1) that is perpendicular to the line L(t)=〈2t−4,4−4t,2−4t〉.

Let A be an m x n matrix and let E be a m x m...

Let A be an m x n matrix and let E be a m x m elementary matrix. Show that EA is the matrix that results from applying the corresponding elementary row operation on A.

find the parametric equation of the line passing through the point (1,7,2), parallel to the plane...

find the parametric equation of the line passing through the point (1,7,2), parallel to the plane x+y+z=2 and perpendicular to the line x=2t, y=(3t+5)2, and z=(4t-1)/3

please choose your favorite, unique plane in R3 that passes though the origin (0,0,0). (An example...

please choose your favorite, unique plane in R3 that passes though the origin (0,0,0). (An example plane is: x + 5y – z = 0. You can use your Module Four Discussion Forum plane through the origin if desired.) What is the equation for your plane? (4 points) What is a basis for the subspace of R3 formed by your plane? Hint: (y and z are free variables.) (8 points) Identify three non-zero vectors on the plane. Do not choose...

Suppose that in a Hilbert plane, lines m and n are parallel. Let P be a...

Suppose that in a Hilbert plane, lines m and n are parallel. Let P be a point on m, and Q the point on n so that line P Q is perpendicular to n. Is there another point R on m so that the perpendicular line RS to n through R (where S is incident with n) so that segment P Q is congruent to RS? Under what conditions? (Note that you need to provide some further hypotheses to make...

Let M be a 3x3 matrix. (4pts) For which matrix E will the transformation EM  ( from...

Let M be a 3x3 matrix. (4pts) For which matrix E will the transformation EM  ( from M to EM) perform an exchange of the first and the third row? (4pts)  What about scaling the second row by a factor of r ? (4pts)  What about adding a times the first row to the third row? (3pts) Can you describe the general forms of these matrices (that represent elementary row operations)?

Let ? denotes the counterclockwise rotation through 60 degrees, followed by reflection in the line ?=?....

Let ? denotes the counterclockwise rotation through 60 degrees, followed by reflection in the line ?=?. (i) Show that ? is a linear transformation. (ii) Write it as a composition of two linear transformations. (iii) Find the standard matrix of ?.

Let L1 be the line passing through the point P1=(−5, −2, −5) with direction vector →d=[2,...

Let L1 be the line passing through the point P1=(−5, −2, −5) with direction vector →d=[2, −3, −2]T, and let L2 be the line passing through the point P2=(4, −1, −5) with the same direction vector. Find the shortest distance d between these two lines, and find a point Q1 on L1 and a point Q2 on L2 so that d(Q1,Q2) = d. Use the square root symbol '√' where needed to give an exact value for your answer.

Let L1 be the line passing through the point P1(3, 5, ?5) with direction vector d=[?1,...

Let L1 be the line passing through the point P1(3, 5, ?5) with direction vector d=[?1, 2, 0]T, and let L2 be the line passing through the point P2(?3, ?4, ?3) with the same direction vector. Find the shortest distance d between these two lines, and find a point Q1 on L1 and a point Q2 on L2 so that d(Q1,Q2) = d. Use the square root symbol '?' where needed to give an exact value for your answer.

Let L1 be the line passing through the point P1(?5, ?3, ?2) with direction vector d=[0,...

Let L1 be the line passing through the point P1(?5, ?3, ?2) with direction vector d=[0, ?3, ?2]T, and let L2 be the line passing through the point P2(?2, 3, ?3) with the same direction vector. Find the shortest distance d between these two lines, and find a point Q1 on L1 and a point Q2 on L2 so that d(Q1,Q2) = d. Use the square root symbol '?' where needed to give an exact value for your answer. d...