TOPICS
This page:
linear algebra
Search
Dr. Math
See also the
Internet Library:
linear algebra
HIGH SCHOOL
About Math
Analysis
Algebra
basic algebra
equations/graphs/
translations
linear algebra
linear equations
polynomials
Calculus
Complex Numbers
Calculators/
Computers
Definitions
Discrete Math
permutations/
combinations
Exponents
Logarithms
Fibonacci Sequence/
Golden Ratio
Fractals
Functions
Geometry
Euclidean/plane
conic sections/
circles
constructions
coordinate plane
triangles/polygons
higherdimensional
polyhedra
nonEuclidean
practical geometry
symmetry/tessellations
History/Biography
Interest
Logic
Negative Numbers
Number Theory
Physics/Chemistry
Probability
Projects
Puzzles
Sequences/Series
Sets
Square/Cube Roots
Statistics
Transcendental
Numbers
Trigonometry

Browse High School Linear Algebra
Stars indicate particularly interesting answers or
good places to begin browsing.
Selected answers to common questions:
Vector questions.
 Row Operations and an Augmented Matrix [07/26/1999]

How can I solve a system of five simultaneous equations using row
operations on the augmented matrix of the system?
 RowReducing a Matrix [04/10/1998]

Could you please teach me how to rowreduce a matrix?
 Shortest Distance between Points [01/17/1998]

I am doing a project on the shortest distance between two points via
another plane. I need help with my theorems.
 Shrunk Axes [01/20/1997]

How do you use the distance formula when the coordinate axes are not
perpendicular?
 Solve for x, y, and z [7/27/1996]

How do I solve for x, y, and z in these three equations: 1/2y +
1/3z = 26, 1/3x + 1/4z = 23, and 1/2x + 1/4y =
28?
 Solving 3x3 Matrices Manually [01/27/1998]

How can I find the inverse of a 3x3 matrix manually (without pushing the
inverse button on my calculator)?
 Solving a 6x6 System of Equations [03/24/1998]

Is there a Cramer's rule for a 6x6 equation?
 Solving Linear Equations in Computer Programs [02/13/2003]

What is the best and simplest method in computer programs for solving
linear equations: Cramers method; Gaussian Elimination method; Inverse
matrix method?
 Solving Systems of Equations Using Matrices [04/02/1999]

Solve the following system of equations: a*(1a) = b*c, b*(a+d1) = 0,
c*(a+d1) = 0, d*(1d) = b*c.
 Solving Systems Using Augmented Matrices [11/05/1996]

How do you solve a set of linear equations using an augmented matrix?
 Some Algebra Problems [6/1/1996]

If z=(32i)^1/2 then find z^...
 The Stationary Vector [11/13/2000]

In Markov processes, what does a stationary vector tell you and how do
you find it?
 Stretching and Shearing away from Coordinate Axes [08/27/2012]

A student struggles to calculate matrices that correspond to linear transformations that
occur off of the x or yaxes. Doctor Schwa formalizes what the student has already done, then introduces a second approach and the concept of conjugations.
 Subspace [01/25/2001]

Determine whether the following is a subspace of R^3...
 Sum of Two Vectors [9/10/1996]

Why is the magnitude of the sum of two vectors less than or equal to the
sum of the magnitudes of each vector?
 Symmetric Matrices [10/27/1999]

Find all values of a, b, and c for which a 3x3 matrix A is symmetric,
where the elements of A contain algebraic expressions in a, b, and c.
 Symmetric Matrices in Everyday Life [05/20/2013]

A student wonders where in the real world a symmetric matrix might come up. Doctor
George offers up two examples.
 System of Equations and GaussJordan [11/29/1998]

Solve using the GaussJordan method: a 5percent solution of a drug is
mixed with 15 and 10percent solutions...
 ThreeDimensional Cross Product Derivation [07/26/1999]

How can we prove the equation for 3dimensional cross products in terms
of the determinants a x (b x c) = (a.c)b  (a.b)c is correct?
 ThreeDimensional Vectors [01/29/2003]

I am finding it very hard to understand and visualise the notion of a
vector in 3 dimensions.
 Two Dogs Pulling a Sled [10/15/2001]

What are the magnitude and direction of the force the person will have to
exert on the sled to keep it moving along the centerline of the road at
constant velocity?
 Two Equations, Two Unknowns [7/27/1996]

How do I solve for x and y in terms of a and b for the equations x^4 +
y^4 = b^4 and x + y = a?
 Types of Linear Systems [10/13/1997]

What is meant when a type of linear system is said to be a consistent or
an inconsistent system?
 Understanding Vector Spaces [03/14/2001]

What does a vector space in R^n mean? How can I prove that a list of
numbers is a vector space?
 Unit Vectors [07/02/2002]

Find the two unit vectors that are collinear with each of the
following vectors. (a) vector A = (3, 5). I don't understandis a
unit vector only ever equal to 1?
 Using an Augmented Matrix [11/21/1999]

Solve the set of simultaneous equations x+3y+z=3, x+5y+5z=1 and 2x+6y+
3z=8 using an augmented matrix?
 Using Determinants to Find Area [06/09/1998]

How can you find the area of a triangle or a parallelogram using
determinants?
 Using Vectors in Geometry and Physics [07/10/1998]

How do you use vectors in problems about medians, areas, and acceleration
and velocity?
 Using Vectors to Prove Collinearity [06/05/1999]

How can I prove that the points of intersection of AB.DE, BC.EF, and
CA.FD are collinear, if concurrent lines 0A, 0B, and 0C are produced to
D, E, and F?
 Values of Scalers [9/11/1996]

Can a scalar quantity be negative?
 Variables Multiplied by Other Variables, Simplified Step by Step [08/22/2011]

If variables get multiplied by other variables in a system of equations, how do you
solve it? or is it even possible? Doctor Vogler outlines several strategies, then 
reflecting on his choices at every turn  methodically simplifies an example that
requires lowering polynomial degree.
 Vector Algebra: Finding the Intersection Point [04/23/2003]

If I have two lines in three dimensions that I know intersect at some
point, how do I work out what that point is? Both lines are defined by
two points on each line.
 Vector Products and Possibilities [10/09/2012]

An engineer wonders how we come to define vector dot and cross products. Doctor
Fenton derives the definition before Doctor Jacques reveals tensor, wedge, and other products.
 Vector Proof [01/17/1999]

Prove that given P, Q, R, and S (any 4 noncollinear points), with A and
B the midpoints of PR and QS respectively, then PQ + RS = 2 AB...
 Vector Proof: Parallelogram Diagonals [01/20/1999]

Use vectors to prove that the diagonals of a parallelogram bisect each
other and the line joining the midpoints of two sides of a triangle...
 Vectors and Orientation [05/29/2003]

I am trying to write a game involving spaceships, and I have been
having trouble finding relative positions.
 Vectors of Parallelograms and Octagons [07/28/1998]

ABCDEFGH is a regular octagon and AB = p and BC = q. Express AH in terms
of p and q...
 Vector Space Dimensions [12/09/1997]

Why does C^2 considered as a vector space over the complex numbers have
dimension 2, but as a vector space over the real numbers have dimension
4?
 Vector Spaces [06/11/1999]

How can I tell if V = {(x,y) in R^2  y = 3x+1} a vector space when
addition and scalar multiplication are defined by (x,y) + (x',y') =
(x+x',y+y'1) and k(x,y) = (kx,k(y1)+1)?
 Volume of a Tetrahedron [01/23/2002]

The volume of a tetrahedron is onethird the distance from a vertex to
the opposite face, times the area of that face. Find a formula for the
volume of a tetrahedron in terms of the coordinates of its vertices P, Q,
R, and S.
Page: [<prev]
1
2
3
4
5
[next>]
