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Physics 207: Lecture 4, Pg 1 Lecture 4 l Today: Ch. 3 (all) & Ch. 4 (start) Perform vector algebra (addition & subtraction) graphically or numerically Interconvert between Cartesian and Polar coordinates Begin working with 2D motion Distinguish position-time graphs from particle trajectory plots Trajectories Obtain velocities Acceleration: Deduce components parallel and perpendicular to the trajectory path Reading Assignment: For Monday read through Chapter 5.3
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Physics 207: Lecture 4, Pg 2 Home Exercise: Welcome to Wisconsin l You are traveling on a two lane highway in a car going a speed of 20 m/s. You are notice that a deer that has jumped in front of a car traveling at 40 m/s and that car avoids hitting the deer but does so by moving into your lane! There is a head on collision and your car travels a full 2m before coming to rest. Assuming that your acceleration in the crash is constant. What is your acceleration in terms of the number of g’s (assuming g is 10 m/s 2 )?
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Physics 207: Lecture 4, Pg 3 Welcome to Wisconsin l You are traveling on a two lane highway in a car going a speed of 20 m/s (~44 mph). You are notice that a deer that has jumped in front of a car traveling at 40 m/s and that car avoids hitting the deer but does so by moving into your lane! There is a head on collision and your car travels a full 2m before coming to rest. Assuming that your acceleration in the crash is constant. What is your acceleration in terms of the number of g’s (assuming g is 10 m/s 2 )? l Draw a Picture l Key facts (what is important, what is not important) l Attack the problem
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Physics 207: Lecture 4, Pg 4 Welcome to Wisconsin l You are traveling on a two lane highway in a car going a speed of 20 m/s. You are notice that a deer that has jumped in front of a car traveling at 40 m/s and that car avoids hitting the deer but does so by moving into your lane! There is a head on collision and your car travels a full 2 m before coming to rest. Assuming that your acceleration in the crash is constant. What is the magnitude of your acceleration in terms of the number of g’s (assuming g is 10 m/s 2 )? l Key facts: v initial = 20 m/s, after 2 m your v = 0. x = x initial + v initial t + ½ a t 2 x - x initial = -2 m = v initial t + ½ a t 2 v = v initial + a t -v initial /a = t -2 m = v initial -v initial /a + ½ a (-v initial /a ) 2 -2 m= -½v initial 2 / a a = (20 m/s) 2 /2 m= 100m/s 2
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Physics 207: Lecture 4, Pg 5 Coordinate Systems and vectors l In 1 dimension, only 1 kind of system, Linear Coordinates (x) +/- l In 2 dimensions there are two commonly used systems, Cartesian Coordinates(x,y) Circular Coordinates(r, ) l In 3 dimensions there are three commonly used systems, Cartesian Coordinates(x,y,z) Cylindrical Coordinates (r, ,z) Spherical Coordinates(r, )
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Physics 207: Lecture 4, Pg 6 Vectors l In 1 dimension, we can specify direction with a + or - sign. l In 2 or 3 dimensions, we need more than a sign to specify the direction of something: r l To illustrate this, consider the position vector r in 2 dimensions. Example Example: Where is Boston ? New York Choose origin at New York Choose coordinate system Boston is 212 miles northeast of New York [ in (r, ) ] OR Boston is 150 miles north and 150 miles east of New York [ in (x,y) ] Boston New York r
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Physics 207: Lecture 4, Pg 7 Vectors... l There are two common ways of indicating that something is a vector quantity: Boldface notation: A “Arrow” notation: A or A A
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Physics 207: Lecture 4, Pg 8 Vectors l Vectors have both magnitude and a direction Examples: displacement, velocity, acceleration The magnitude of A ≡ |A| Usually vectors include units (m, m/s, m/s 2 ) l For vector algebra ( +/ -)a vector has no particular position (Note: the position vector reflects displacement from the origin) l Two vectors are equal if their directions, magnitudes & units match. A B C A = C A = B, B = C
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Physics 207: Lecture 4, Pg 9 Scalars l A scalar is an ordinary number. A magnitude ( can be negative ) without a direction Often it will have units (i.e. kg) but can be just a number Usually indicated by a regular letter, no bold face and no arrow on top. Note: Lack of a specific designation can lead to confusion l The product of a vector and a scalar is another vector in the same “direction” but with modified magnitude. A B A = -0.75 B
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Physics 207: Lecture 4, Pg 10 Exercise Vectors and Scalars A. my velocity (3 m/s) B. my acceleration downhill (30 m/s2) C. my destination (the lab - 100,000 m east) D. my mass (150 kg) Which of the following is cannot be a vector ? While I conduct my daily run, several quantities describe my condition
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Physics 207: Lecture 4, Pg 11 Vectors and 2D vector addition l The sum of two vectors is another vector. A = B + C B C A B C D = B + 2 C ???
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Physics 207: Lecture 4, Pg 12 2D Vector subtraction l Vector subtraction can be defined in terms of addition. B - C B C B -C-C = B + (-1)C A Different direction and magnitude ! A = B + C
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Physics 207: Lecture 4, Pg 13 Reference vectors: Unit Vectors l A Unit Vector is a vector having length 1 and no units l It is used to specify a direction. uU l Unit vector u points in the direction of U u Often denoted with a “hat”: u = û U = |U| û û x y z i j k l Useful examples are the cartesian unit vectors [ i, j, k ] or Point in the direction of the x, y and z axes. R = r x i + r y j + r z k
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Physics 207: Lecture 4, Pg 14 Vector addition using components: l Consider, in 2D, C = A + B. Ciji ji (a) C = (A x i + A y j ) + (B x i + B y j ) = (A x + B x )i + (A y + B y ) Cij (b) C = (C x i + C y j ) l Comparing components of (a) and (b): C x = A x + B x C y = A y + B y |C| =[ (C x ) 2 + (C y ) 2 ] 1/2 C BxBx A ByBy B AxAx AyAy
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Physics 207: Lecture 4, Pg 15 Example Vector Addition A. {3,-4,2} B. {4,-2,5} C. {5,-2,4} D. None of the above l Vector A = {0,2,1} l Vector B = {3,0,2} l Vector C = {1,-4,2} What is the resultant vector, D, from adding A+B+C?
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Physics 207: Lecture 4, Pg 16 Example Vector Addition A. { A. {3,-4,2} B. {4,-2,5} C. {5,-2,4} D. None of the above l Vector A = {0,2,1} l Vector B = {3,0,2} l Vector C = {1,-4,2} What is the resultant vector, D, from adding A+B+C?
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Physics 207: Lecture 4, Pg 17 Converting Coordinate Systems In polar coordinates the vector R = (r, ) l In Cartesian the vector R = (r x,r y ) = (x,y) We can convert between the two as follows: In 3D cylindrical coordinates (r, z), r is the same as the magnitude of the vector in the x-y plane [sqrt(x 2 +y 2 )] tan -1 ( y / x ) y x (x,y) r ryry rxrx
![Physics 207: Lecture 4, Pg 17 Converting Coordinate Systems In polar coordinates the vector R = (r, ) l In Cartesian the vector R = (r x,r y ) = (x,y) We can convert between the two as follows: In 3D cylindrical coordinates (r, z), r is the same as the magnitude of the vector in the x-y plane [sqrt(x 2 +y 2 )] tan -1 ( y / x ) y x (x,y) r ryry rxrx](http://images.slideplayer.com/20/6012386/slides/slide_17.jpg "Physics 207: Lecture 4, Pg 17 Converting Coordinate Systems In polar coordinates the vector R = (r, ) l In Cartesian the vector R = (r x,r y ) = (x,y) We can convert between the two as follows: In 3D cylindrical coordinates (r, z), r is the same as the magnitude of the vector in the x-y plane [sqrt(x 2 +y 2 )] tan -1 ( y / x ) y x (x,y) r ryry rxrx")
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Physics 207: Lecture 4, Pg 18 Resolving vectors into components A mass on a frictionless inclined plane A block of mass m slides down a frictionless ramp that makes angle with respect to horizontal. What is its acceleration a ? m a
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Physics 207: Lecture 4, Pg 19 Resolving vectors, little g & the inclined plane g (bold face, vector) can be resolved into its x,y or x ’,y ’ components g = - g j g = - g cos j ’ + g sin i ’ The bigger the tilt the faster the acceleration….. along the incline x’x’ y’y’ x y g
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Physics 207: Lecture 4, Pg 20 Dynamics II: Motion along a line but with a twist (2D dimensional motion, magnitude and directions) l Particle motions involve a path or trajectory l Recall instantaneous velocity and acceleration l These are vector expressions reflecting x, y & z motion r = r (t)v = d r / dta = d 2 r / dt 2
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Physics 207: Lecture 4, Pg 21 Instantaneous Velocity l But how we think about requires knowledge of the path. l The direction of the instantaneous velocity is along a line that is tangent to the path of the particle’s direction of motion. v The magnitude of the instantaneous velocity vector is the speed, s. (Knight uses v) s = (v x 2 + v y 2 + v z ) 1/2
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Physics 207: Lecture 4, Pg 22 Average Acceleration l The average acceleration of particle motion reflects changes in the instantaneous velocity vector (divided by the time interval during which that change occurs). l The average acceleration is a vector quantity directed along ∆v ( a vector! )
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Physics 207: Lecture 4, Pg 23 Instantaneous Acceleration l The instantaneous acceleration is the limit of the average acceleration as ∆v/∆t approaches zero l The instantaneous acceleration is a vector with components parallel (tangential) and/or perpendicular (radial) to the tangent of the path l Changes in a particle’s path may produce an acceleration The magnitude of the velocity vector may change The direction of the velocity vector may change (Even if the magnitude remains constant) Both may change simultaneously (depends: path vs time)
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Physics 207: Lecture 4, Pg 24 Motion along a path ( displacement, velocity, acceleration ) l 2 or 3D Kinematics : vector equations: rrvrar r = r( t) v = dr / dt a = d 2 r / dt 2 Velocity : r v = dr / dt r v av = r / t Acceleration : v a = dv / dt v a av = v / t vvvv y x path
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Physics 207: Lecture 4, Pg 25 Generalized motion with non-zero acceleration: need both path & time Two possible options: Change in the magnitude of v Change in the direction of v a = 0 a a a a = + Animation
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Physics 207: Lecture 4, Pg 26 Kinematics l The position, velocity, and acceleration of a particle in 3-dimensions can be expressed as: r = x i + y j + z k v = v x i + v y j + v z k (i, j, k unit vectors ) a = a x i + a y j + a z k l All this complexity is hidden away in r = r( t)v = dr / dta = d 2 r / dt 2
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Physics 207: Lecture 4, Pg 27 Special Case Throwing an object with x along the horizontal and y along the vertical. x and y motion both coexist and t is common to both Let g act in the – y direction, v 0x = v 0 and v 0y = 0 y t 0 4 x t = 0 4 y t x 0 4 x vs t y vs t x vs y
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Physics 207: Lecture 4, Pg 28 Another trajectory x vs y t = 0 t =10 Can you identify the dynamics in this picture? How many distinct regimes are there? Are v x or v y = 0 ? Is v x >,< or = v y ? y x
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Physics 207: Lecture 4, Pg 29 Exercise 1 & 2 Trajectories with acceleration l A rocket is drifting sideways (from left to right) in deep space, with its engine off, from A to B. It is not near any stars or planets or other outside forces. l Its “constant thrust” engine (i.e., acceleration is constant) is fired at point B and left on for 2 seconds in which time the rocket travels from point B to some point C Sketch the shape of the path from B to C. l At point C the engine is turned off. Sketch the shape of the path after point C (Note: a = 0)
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Physics 207: Lecture 4, Pg 30 Exercise 1 Trajectories with acceleration A. A B. B C. C D. D E. None of these B C B C B C B C A C B D From B to C ?
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Physics 207: Lecture 4, Pg 31 Exercise 2 Trajectories with acceleration A. A B. B C. C D. D E. None of these B C B C B C B C A C B D From B to C ?
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Physics 207: Lecture 4, Pg 32 Exercise 3 Trajectories with acceleration A. A B. B C. C D. D E. None of these C C C C A C B D After C ?
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Physics 207: Lecture 4, Pg 33 Lecture 4 Assignment: Read all of Chapter 4, Ch. 5.1-5.3
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