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Graphical Analytical Component Method. Vector Addition. What does an ordered pair mean in math? Ex:(2,3). Math sTUFF. Quantities having both magnitude and direction Magnitude: How much (think of it as the length of the line) Direction: Which way is it pointing?
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Graphical Analytical Component Method Vector Addition
Quantities having both magnitude and direction • Magnitude: How much (think of it as the length of the line) • Direction: Which way is it pointing? • Can be represented by an arrow-tipped line segment • Examples: • Velocity • Acceleration • Displacement • Force Vectors
Compare the two vectors. What makes them different Question:
Direction The magnitude or length is exactly the same Answer
Two or more vectors acting on the same point are said to be concurrent vectors. • The sum of 2 or more vectors is called the resultant (R). • A single vector that can replace concurrent vectors • Any vector can be described as having both x and y components in a coordinate system. • The process of breaking a single vector into its x and y components is called vector resolution. Vector Terminology
Vectors are said to be in equilibrium if their sum is equal to zero. • A single vector that can be added to others to produce equilibrium is call the equilibrant (E). • Equal to the resultant in magnitude but opposite in direction. More Vector Terminology E + R = 0 E = - R E = 5 N R = 5 N at 180 ° at 0°
E= 10 N at 0 degrees R = 20 N at 0 degrees What is the resultant of the following vectors?
30 N at 0 degrees Answer
20 N at 45 degrees 10 N at 225 degrees Do not get freaked out by the angles, Think about it for a second. Question
10 N at 45 degrees Answer
Vectors are drawn to scale and the resultant is determined using a ruler and protractor. • Vectors are added by drawing the tail of the second vector at the head of the first (tip to tail method). • The order of addition does not matter. • The resultant is always drawn from the tail of the first to the head of the last vector. Using the Graphical Method of Vector Addition:
Example Problem A 50 N force at 0° acts concurrently with a 20 N force at 90°. R R and are equal on each diagram.
Answer b a R= a+b
Perpendicular vectors act independently of one another. In problems requesting information about motion in a certain direction, choose the vector with the same direction. Motion Applications
A boat heads east at 8.00 m/s across a river flowing north at 5.00 m/s. • What is the resultant velocity of the boat? Example Problem:Motion in 2 Dimensions
A boat heads east at 8.00 m/s across a river flowing north at 5.00 m/s. 5.00 m/s N 8.00 m/s E River width
What is the resultant velocity of the boat? Draw to scale and measure. 5.00 m/s N 8.00 m/s E R = 9.43 m/s at 32°
Advantages and Disadvantages of the Graphical Method • Can add any number of vectors at once • Uses simple tools • No mathematical equations needed • Must be correctly draw to scale and at appropriate angles • Subject to human error • Time consuming
A rough sketch of the vectors is drawn. • The resultant is determined using: • Algebra • Trigonometry • Geometry Solving Vectors Using the Analytical Method
Quick Review Right Triangle c is the hypotenuse B c2 = a2 + b2 c sin = o/h cos = a/h tan = o/a a A + B + C = 180° B = 180° – (A + 90°) C A b tan A = a/b tan B = b/a
These Laws Work for Any Triangle. A + B + C = 180° C Law of sines: a = b = c sin A sin B sin C b a B A c Law of cosines: c2 = a2 + b2 –2abCos C
Use the Law of: • Sines when you know: • 2 angles and an opposite side • 2 sides and an opposite angle • Cosines when you know: • 2 sides and the angle between them
Draw a tip to tail sketch first. • To determine the magnitude of the resultant • Use the Pythagorean theorem. • To determine the direction • Use the tangent function. For right triangles:
Find the resultant for the first two vectors. Add the resultant to vector 3 and find the new resultant. Repeat as necessary. To add more than two vectors:
Advantages and Disadvantagesof the Analytical Method • Does not require drawing to scale. • More precise answers are calculated. • Works for any type of triangle if appropriate laws are used. • Can only add 2 vectors at a time. • Must know many mathematical formulas. • Can be quite time consuming.
Each vector is replaced by 2 perpendicular vectors called components. Add the x-components and the y-components to find the x- and y-components of the resultant. Use the Pythagorean theorem and the tangent function to find the magnitude and direction of the resultant. Solving Vector Problems using the Component Method
Vector Resolution y = h sin x = h cos h y x • + ++ • - +-
What are the components of the following force 25N @ 12 degrees North of West Question
West is 180 degrees to 12 degrees north of west is 168 degrees The X component is -24.45N The Y component is 5.20N You can confirm you answer –X and +Y would be found in the second quadrant on a graph so this answer makes sense Answer
Example: 6 N at 135° 5 N at 30° R = (0.09)2 + (6.74)2 = 6.74 N = arctan 6.74/0.09 = 89.2°
The tangent function has 2 places that it is not defined (you get an error on your calculator) • 90 degrees and 270 degrees • The x and y components tell you the angle range Tangent Function
My X component was negative and my y component was negative as well. My calculator told me that my answer was 22 degrees. What is my true angle? Question: Critical THinking
My evidence: • Negative X • Negative Y • We are in quadrant three(between 180 degrees and 270) • I got 22 degrees, so I must take 180+22 to get 202degree as my angle! Using my tangent rules Answer
Solve the following problem using the component method. 10 km at 30 6 km at 120
Adding Vectors To find the magnitude: pythagoreantheorum To find the direction: 1. Take into account if either X or y is + or – 2. Use any trig function SOH CAH TOA to find angle
I get a positive x and a negative y component when I add them together. What degree range is my angle in? Critical Thinking Question 2
X is positive so that can only mean either quadrant 1 or 4 Y is negative so that means you have to get quadrant 4 as your answer 270 to 360 degrees Answer
Make sure that all angles are measured from the x axis (0 degrees) Report both the magnitude and the direction otherwise the vector is wrong! Keep track of signs, They give you a clue to where the angle of the vector actually is. Notes
Adding two vectors Find the resultant magnitude: Find the resultant direction: