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Trigonometric Method of Adding Vectors
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Analytic Method of Addition
Resolution of vectors into components: YOU MUST KNOW & UNDERSTAND TRIGONOMETERY TO UNDERSTAND THIS!!!!
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Vector Components Any vector can be expressed as the sum of two other vectors, called its components. Usually, the other vectors are chosen so that they are perpendicular to each other. Consider the vector V in a plane (say, the xy plane) We can express V in terms of COMPONENTS Vx , Vy Finding THE COMPONENTS Vx & Vy is EQUIVALENT to finding 2 mutually perpendicular vectors which, when added (with vector addition) will give V.
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COMPONENTS Vx , Vy We can express any vector V in terms of
Finding Vx & Vy is EQUIVALENT to finding 2 mutually perpendicular vectors which, when added (with vector addition) will give V.
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V Vx + Vy (Vx || x axis, Vy || y axis) “Resolving into Components”
We can express any vector V in terms of COMPONENTS Vx , Vy Finding Vx & Vy is EQUIVALENT to finding 2 mutually perpendicular vectors which, when added (with vector addition) will give V. That is, we want to find Vx & Vy such that V Vx + Vy (Vx || x axis, Vy || y axis) Finding Components “Resolving into Components”
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Rectangular Components
Mathematically, a component is a projection of a vector along an axis. Any vector can be completely described by its components It is useful to use Rectangular Components These are the projections of the vector along the x- and y-axes
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THE VECTOR SUM IS: V = Vx + Vy
V is Resolved Into Components: Vx & Vy V Vx + Vy (Vx || x axis, Vy || y axis) By the parallelogram method, clearly THE VECTOR SUM IS: V = Vx + Vy In 3 dimensions, we also need a Vz.
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Hypotenuse h, Adjacent side a
Brief Trig Review Adding vectors in 2 & 3 dimensions using components requires TRIG FUNCTIONS HOPEFULLY, A REVIEW!! See also Appendix A!! Given any angle θ, we can construct a right triangle: h o a Hypotenuse h, Adjacent side a Opposite side o
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[Pythagorean theorem]
Define the trig functions in terms of h, a, o: = (opposite side)/(hypotenuse) = (adjacent side)/(hypotenuse) = (opposite side)/(adjacent side) [Pythagorean theorem]
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Trig Summary Pythagorean Theorem: r2 = x2 + y2
Trig Functions: sin θ = (y/r), cos θ = (x/r) tan θ = (y/x) Trig Identities: sin² θ + cos² θ = 1 Other identities are in Appendix B & the back cover.
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Signs of the Sine, Cosine & Tangent
Trig Identity: tan(θ) = sin(θ)/cos(θ)
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Inverse Functions and Angles
To find an angle, use an inverse trig function. If sin = y/r then = sin-1 (y/r) Also, angles in the triangle add up to 90° + = 90° Complementary angles sin α = cos β
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Using Trig Functions to Find Vector Components
We can use all of this to Add Vectors Analytically! Pythagorean Theorem
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Components From Vectors
The x- and y-components of a vector are its projections along the x- and y-axes Calculation of the x- and y-components involves trigonometry Ax = A cos θ Ay = A sin θ
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Vectors From Components
If we know the components, we can find the vector. Use the Pythagorean Theorem for the magnitude: Use the tan-1 function to find the direction:
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V = Displacement = 500 m, 30º N of E
Example V = Displacement = 500 m, 30º N of E
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V = Displacement = 500 m, 30º N of E
Example V = Displacement = 500 m, 30º N of E
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Example Consider 2 vectors, V1 & V2. We want V = V1 + V2 Note: The components of each vector are one-dimensional vectors, so they can be added arithmetically.
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“Recipe” for adding 2 vectors using trig & components:
We want the sum V = V1 + V2 “Recipe” for adding 2 vectors using trig & components: 1. Sketch a diagram to roughly add the vectors graphically. Choose x & y axes. 2. Resolve each vector into x & y components using sines & cosines. That is, find V1x, V1y, V2x, V2y. (V1x = V1cos θ1, etc.) 3. Add the components in each direction. (Vx = V1x + V2x, etc.) 4. Find the length & direction of V by using:
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Adding Vectors Using Components
We want to add two vectors: To add the vectors, add their components Cx = Ax + Bx Cy = Ay + By Knowing Cx & Cy, the magnitude and direction of C can be determined
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Example A rural mail carrier leaves the post office & drives
22.0 km in a northerly direction. She then drives in a direction 60.0° south of east for 47.0 km. What is her displacement from the post office?
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Solution, page 1 A rural mail carrier leaves the post office & drives 22.0 km in a northerly direction. She then drives in a direction 60.0° south of east for 47.0 km. What is her displacement from the post office?
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Solution, page 2 A rural mail carrier leaves the post office & drives 22.0 km in a northerly direction. She then drives in a direction 60.0° south of east for 47.0 km. What is her displacement from the post office?
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Example A plane trip involves 3 legs, with 2 stopovers: 1) Due east
for 620 km, 2) Southeast (45°) for 440 km, 3) 53° south of west, for 550 km. Calculate the plane’s total displacement.
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Solution, Page 1 A plane trip involves 3 legs, with 2 stopovers: 1) Due east for 620 km, 2) Southeast (45°) for 440 km, 3) 53° south of west, for 550 km. Calculate the plane’s total displacement.
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Solution, Page 2 A plane trip involves 3 legs, with 2 stopovers: 1) Due east for 620 km, 2) Southeast (45°) for 440 km, 3) 53° south of west, for 550 km. Calculate the plane’s total displacement.
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You cannot solve a vector problem Without sketching a diagram!
Problem Solving You cannot solve a vector problem Without sketching a diagram!
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Another Analytic Method
Uses Law of Sines & Law of Cosines from trig. Consider an arbitrary triangle: a c β α γ b Law of Cosines: c2 = a2 + b2 - 2 a b cos(γ) Law of Sines: sin(α)/a = sin(β)/b = sin(γ)/c
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Add 2 vectors: C = A + B. Given A, B, γ
β C A α B γ Law of Cosines: C2 = A2 + B2 -2 A B cos(γ) Gives length of resultant C. Law of Sines: sin(α)/A = sin(γ)/C, or sin(α) = A sin(γ)/C Gives angle α
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