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Fundamentals of Physics I PHYSICS 1501 CRN # 23140 SPRING 2010 8:00 am – 8:50 am Instructor: Dr. Tom N. Oder Office: WBSH 1016 E-mail: [email protected], phone (330) 941-7111 Office Hours: M, T, W, F 1:00 pm – 2:00 pm. Research: (Wide Band Gap) Semiconductors. Website: www.ysu.edu/physics/tnoder Class website: www.ysu.edu/physics/tnoder/S10-PHYS1501/index.html Requirements (a) Passing grade in Algebra/Trig (Math 1504 or YSU Math Placement Test). (b) Text: College Physics, By A. Giambattista et al., 2nd Edition (c) A “ResponseCard RF” from Turning Technology (available at the Bookstore). Hard Cover version YSU Customized version Vol. 1 Regular/Punctual Class attendance encouraged. Homework: In the Syllabus, will not be graded. For your practice Quizzes and Worksheets: • Short in-class Quizzes • Worksheets – group exercises. • No make-ups. • Least four scores will be dropped. Exams No make-ups will be given. Midterm 1: on Fri. Feb 5th. Midterm 2: on Fri. March 5th. Midterm 3: on Fri. April 16th. Finals: Ch.1-8, 10-12 Mon. May 3rd, 8:00 –10:00am Exam questions will be developed from questions in the Homework/Quizzes/Worksheets/Class notes. Grading: Quizzes/Worksheets :100 points Midterms (100 points each): 300 points Final Exams: 200 points. Final Grade: 540 – 600 points (90% - 100%) = A 480 – 539 points (80% - 89%) = B 420 – 479 points (70% - 79%) = C 360 – 419 points (60% - 69%) = D 0 – 359 points (0% - 59%) = F No bonus points, no grade-curving Cell Phones: • Cell phones must be muted or turned off during class and exam sessions. •A student whose cell phone audibly goes on during any exam will lose 5% of his/her points in that exam. Chapter 1: INTRODUCTION • Physics: branch of physical science that deals with energy, matter, space and time. • Developed from effort to explain the behavior of the physical environment. • Summary: laws of Physics, Formula, graphs. • Basis of rocket/space travel, modern electronics, lasers, medical science etc. • Major goal: reasoning critically (as a physicist), sound conclusions, applying the principles learnt. • We will use carefully defined words, e.g. velocity, speed, acceleration, work, etc. § 1.3: The Use of Mathematics • Factor (or ratio) – number by which a quantity is multiplied or divided when changed from one value to another. • Eg. The volume of a cylinder of radius r and height h is V = r2h. If r is tripled, by what factor will V change? • Vold = r2h, Vnew = (3r)2h = 9. r2h, Vnew/Vold = 9. V will increase by a factor of 9. (a) Decreasing the number 120 by 30% gives ---(b)Increasing the number 120 by 30% gives ----- Proportion • If two quantities change by the same factor, they are directly proportional to each other. • A B – means if A is doubled, B will also double. • S r2 – means if S is decreased by factor 1/3, r2 (not r!) will also decrease by the same factor. Inverse Proportion • If A is inversely proportional to B – means if A is increased by a certain factor, B will decrease by the same factor. • K inversely proportional to r [K 1/r] – means if r is increased by factor 3, K will decrease by the same factor. • The area of a circle is A = r2. (a)If r is doubled, by what factor will A change? (b)If A is doubled, by what factor will r change? An expression is written as 2 f 2L K 3 Pr From this expression, we can conclude that: (A)K is directly proportional to f (B)K is directly proportional to f2 (C)K is inversely proportional to P (D)K is inversely proportional to 1/P3 An expression is written as 2 2f L K 3 Pr From this expression, we can conclude that: A. K is directly proportional to f B. K is directly proportional to f2 C. K is inversely proportional to P D. K is inversely proportional to 1/P3 Examples The area of a circle is A = r2. (a)If r is doubled, by what factor will A change? (b)If A is doubled, by what factor will r change? § 1.4: Scientific notation: • Rewriting a number as a product of a number between 1 and 10 and a whole number power of ten. • Helps eliminate using too many zeros. • Helps to correctly locate the decimal place when reporting a quantity. • Eg: Radius of earth = 6,380,000 m = 6.38 x 106 m Radius of a hydrogen atom = 0.000 000 000 053 m = 5.3 x 10-11 m. Precision/Accuracy in Scientific Measurements • In reporting a scientific measurement, it is important to indicate the degree of precision and the accuracy of your measurement. • This can be done using absolute (or percentage) error, significant figures and order of magnitude, etc. What is the difference between accuracy and precision? Precision: • Reproducibility or uniformity of a result. • Indication of quality of method by which a set of results is obtained. • A more precise instrument is the one which gives very nearly the same result each time it is used. • A precise data may be inaccurate!! Accuracy: • How close the result is to the accepted value. • Indication of quality of the result. • A more accurate instrument is the one which gives a measurement closer to the accepted value. Precise/Accurate Precise/Not Accurate Not Precise/Accurate Not Precise/Not Accurate (a)Absolute/Percentage error: Eg. Length of a notebook = 27.9 ± 0.2 cm Actual length is somewhere between 27.9 – 0.2 and 27.9+0.2, ie 27.7 and 28.1 cm ± 0.2 is the estimated uncertainty (error). 0.2 is the absolute uncertainty (error). 27.9 is the central value 27.7 and 28.1 are called extreme values. Percentage Uncertainty Absolute Error x 100 Percentage uncertainty = Central Value Eg. Length of a notebook = 27.9 ± 0.2 cm % Uncertainty = 0.2 x 100 0.7% 27.9 AbsoluteError Fractional Error CentralValue 0 .2 27.9 Examples • The length of a table was found to be 1.5 m with 8% error. What was the absolute error (uncertainty) of this measurement? • The mass of a bag was found to be 12.5 0.6 kg. What was the percent error in this measurement? Error Propagation in Addition/Subtraction The absolute error in the sum or difference of two or more numbers is the SUM of the absolute errors of the numbers. x x and y y Sum ( x y ) (x y ) Difference ( x y ) (x y ) Eg. 8.5 0.2 cm and 6.9 0.3 cm Sum = 15.4 0.5 cm Difference = 1.6 0.5 cm Error Propagation in Multiplication/Division The fractional error in the product or quotient of two numbers is the SUM of the fractional errors of the numbers. x x x and y y y x y Fractional errors : in x is and in yis x y Pr oduct P P P x. y P x y Fractional error in P is which is ( ) P x y x Quotient Q Q Q y Q x y Fractional error Q is which is ( ) Q x y Error Propagation in Multiplication/Division Eg. x = 8.5 0.2 cm and y = 6.9 0.3 cm Fractional errors: 0 .3 0 . 2 in y = = in x = = 6 .9 8 .5 Find the product, P = x.y and its absolute uncertainty (P). (b) Significant Figures: Number of reliably known digits in a measurement. Includes one “doubtful” or estimated digit written as last digit. Eg. 2586 [6 is the last digit. It is the doubtful digit]. Eg. 25.68 [8 is the last digit. It is the doubtful digit]. Significant Figures contd: • All nonzero digits are significant. • Zeros in between significant figures are significant.[2,508] • Ending zeros written to the right of the decimal point are significant. [0.047100] • Zeros written immediately on either sides of decimal point for identifying place value are not significant. [0.0258, 0.258] • Zeros written as final digits are ambiguous.[25800] To remove ambiguity, rewrite using scientific notation. • Eg. (i) 58.63 – 4 sf, (ii) 0.0623 – 3 sf, (iii) 5.690 x 105 – 4 sf. (iv) 25800 – 2.58x 104 = 3 sf, 2.580x 104 = 4 sf, 2.5800x 104 = 5 sf. Significant Figures in Addition/Subtraction The sum/difference can not be more precise than the least precise quantities involved. ie, the sum/difference can have only as many decimal places as the quantity with the least number of decimal places. Eg: 1) 50.2861 m + 1832.5 m + 0.893 m = 2) 77.8 kg – 39.45 kg = “keep the least number of decimal places” Significant Figures in Multiplication/Division The product/quotient can have only as many sf as the number with the least amount of sf. Eg: 1) What is the product of 50.2861 m and 1832.5 m? 2) What is 568 m divided by 2.5 s? “keep the least number of significant figures” (c) Order of Magnitude – (roughly what power of ten?) To determine the order of magnitude of a number: • Write the number purely as a power of ten. • Numbers < 5 are rounded to 100 • Numbers 5 are rounded to101 • Eg. 754 =7.54 x 102 ~101 x 102 = 103. The order of magnitude of 754 is 3. • 403,179 = 4.03179 x 105 ~100 x 105 = 105 = 5 O/M • 0.00587 ~ orders of magnitude = - 2 (how?). § 1.5: Units We will use the SI system of units which is an international system of units adapted in 1960 by the General Council of Weights and Measures. • In SI system: Length is measured in meters (m). Mass is measured in kilograms (kg). Time is measured in seconds (s). • Other fundamental quantities and their units in the SI system includes Temperature (in Kelvin, K), Electric current (in Amperes, A) Amount of substance (in mole, mol) and Luminosity (in Candela, cd). • The SI system is part of the metric system which is based on the power of ten. Converting Between Units Eg. Convert 65 miles/hour to SI units. 1 mile = 1.609 km = 1609 m. 1 hour = 3,600 seconds 65 miles 65 x 1609m 29.1 m / s 1 hour 1 x 3600s § 1.6: Dimensional Analysis Dimensions – Units of basic (Fundamental) quantities: Mass [M], Length [L], Time [T] We can only add, subtract or equate quantities with the same dimensions. Eg. 1 Check if the expression v = d2/t is correct, where v = speed (in m/s), d is the distance (in m) and t is time (in s). Quantity Dimension [ L] V [T ] d2 T v = d2/t [L]2 [T] [ L] [ L]2 [T ] [T ] Hence eqn is not correct Eg. 2: If the equation was now correctly written as v = kd2/t, what must be the units of k? 2 [ L] [ L] 1 k k [T ] [T ] [ L] The units of k must be m-1 § 1.7-1.9: Reading Assignment 1. The SI units of length and mass are meter and pound meter and kilogram meter and second kilometer and kilogram centimeter and gram 50% 50% ce an d ki nt lo im gr am et er an d gr am nd co lo m et er ki m et er an d an et er d ki se lo g un d po d an m et er 0% 0% ra m 0% m A. B. C. D. E. 3 m 2 10 8 2. 5 x 3. 25 75 3. 25 m 3 m 3 m 3 .6 23 24 m 3 2. A rectangular container has sides of dimensions 14.5 m by 2.8 m by 6.25 m. The volume of this container, keeping the correct 50% 50% significant figures is A. 24 m3 B. 23.6 m3 C. 253.75 m3 D. 253.8 m3 0% 0% 0% E. 2.5 x 102 m3 3. The mass of a watermelon was measured to be 12.6 kg. If the percent uncertainty in this measurement was 12.0 %, what was the absolute uncertainty in the measurement? 100% 0. 95 2 kg 0% 0 10 51 kg 0. 0. 60 0 kg .0 12 0% kg 0% kg 0% 1. (A)12.0 kg (B)0.600 kg (C)1.51 kg (D)0.100 kg (E)0.952 kg 4. What is the order of magnitude of the number 680,835? 50% 0% 7 0% 4 5 0% 8 50% 6 (A)6 (B)5 (C)4 (D)7 (E)8 5. The area of a circle is increased by 40%. By what percent has its radius increased? [Area of a circle of radius r is given by the formula r2] 50% % 85 % 0% 18 % 0. 18 % 0% 20 6. 30 % 0% 0% % 50% 80 (A)6.3% (B) 20% (C) 0.18% (D) 18% (E) 85% (F) 80% 6. How many significant figures will the sum of 15.3 + 26.20 + 198.071 contain? 0% 3. 6 4 0% 3 0% 50% 29 50% 6 1 3 4 6 293.6 1 A. B. C. D. E. The radius (r) of a circle is quadrupled. By what factor will its area change? [Area = pr2] 1. 2. 3. 4. 5. 16 8 4 ¼ 1/16 What is the order of magnitude of the number 89,792? 1. 2. 3. 4. 5. 6 5 9 7 9x104 What is 36.18/2.2 when the rule of significant figures is followed? 1. 2. 3. 4. 16 16.4 16.44 16.445 The length of a room was measured and found to be 4.9 ± 0.2 m. What is the percentage error in this measurement? 1. 2. 3. 4. 5. 0.04% 24.5% 4% 4.9% 0.98%