Study Guide 1 - MA 261 - Fall 2009 Study Guide # 1 1....

Info iconThis preview shows pages 1–3. Sign up to view the full content.

View Full Document Right Arrow Icon
MA 261 - Fall 2009 Study Guide # 1 1. Vectors in R 2 and R 3 (a) ~ v = h a, b, c i = a ~ i + b ~ j + c ~ k ; vector addition and subtraction geometrically using paral- lelograms spanned by ~ u and ~ v ; length or magnitude of ~ v = h a, b, c i , | ~ v | = a 2 + b 2 + c 2 ; directed vector from P 0 ( x 0 ,y 0 ,z 0 )t o P 1 ( x 1 1 1 )g i v enb y ~ v = P 0 P 1 = P 1 - P 0 = h x 1 - x 0 1 - y 0 1 - z 0 i . (b) Dot (or inner) product of ~ a = h a 1 ,a 2 3 i and ~ b = h b 1 ,b 2 3 i : ~ a · ~ b = a 1 b 1 + a 2 b 2 + a 3 b 3 ; properties of dot product; useful identity: ~ a · ~ a = | ~ a | 2 ; angle between two vectors ~ a and ~ b : cos θ = ~ a · ~ b | ~ a || ~ b | ; ~ a ~ b if and only if ~ a · ~ b = 0; the vector in R 2 with length r with angle θ is ~ v = h r cos θ, r sin θ i : x y 0 θ r (c) Projection of ~ b along ~ a :p r o j ~ a ~ b = ( ~ a · ~ b | ~ a | ) ~ a | ~ a | ;Work= ~ F · ~ D . b proj a proj a b b a a b (d) Cross product (only for vectors in R 3 ): ~ a × ~ b = ± ± ± ± ± ± ~ i ~ j ~ k a 1 a 2 a 3 b 1 b 2 b 3 ± ± ± ± ± ± = ± ± ± ± a 2 a 3 b 2 b 3 ± ± ± ± ~ i - ± ± ± ± a 1 a 3 b 1 b 3 ± ± ± ± ~ j + ± ± ± ± a 1 a 2 b 1 b 2 ± ± ± ± ~ k properties of cross products; ~ a × ~ b is perpendicular (orthogonal or normal) to both ~ a and ~ b ; area of parallelogram spanned by ~ a and ~ b is A = | ~ a × ~ b | : b a the area of the triangle spanned is A = 1 2 | ~ a × ~ b | : b a
Background image of page 1

Info iconThis preview has intentionally blurred sections. Sign up to view the full version.

View Full DocumentRight Arrow Icon
Volume of the parallelopiped spanned by ~ a , ~ b ,~ c is V = | ~ a · ( ~ b × ~ c ) | : b a c 2. Equation of a line L through P 0 ( x 0 ,y 0 ,z 0 ) with direction vector ~ d = h a, b, c i : Vector Form : ~ r ( t )= h x 0 0 0 i + t ~ d . (x ,y ,z ) 000 d Parametric Form : x = x 0 + at y = y 0 + bt z = z 0 + ct Symmetric Form : x - x 0 a = y - y 0 b = z - z 0 c .( I fsay b =0,then x - x 0 a = z - z 0 c = y 0 . ) 3. Equation of the plane through the point P 0 ( x 0 0 0 ) and perpendicular to the vector ~ n = h a, b, c i ( ~ n is a normal vector to the plane) is h ( x - x 0 ) , ( y - y 0 ) , ( z - z 0 ) ~ n = 0; Sketching planes (consider x, y, z intercepts).
Background image of page 2
Image of page 3
This is the end of the preview. Sign up to access the rest of the document.

This note was uploaded on 10/16/2009 for the course MA 261 taught by Professor Stefanov during the Spring '08 term at Purdue University.

Page1 / 5

Study Guide 1 - MA 261 - Fall 2009 Study Guide # 1 1....

This preview shows document pages 1 - 3. Sign up to view the full document.

View Full Document Right Arrow Icon
Ask a homework question - tutors are online