Physics for Scientists & Engineers & Modern Physics, 9th Ed
Pitfall Prevention 1.3
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- Example 1.2 Analysis of a Power Law
- S o L u t i o n
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1.4
Pitfall Prevention 1.3 Always include units When per- forming calculations with numeri- cal values, include the units for every quantity and carry the units through the entire calculation. Avoid the temptation to drop the units early and then attach the expected units once you have an answer. By including the units in every step, you can detect errors if the units for the answer turn out to be incorrect. Write an expression for a with a dimensionless constant of proportionality k: a 5 kr n v m Substitute the dimensions of a, r, and v: L T 2 5 L n a L Tb m 5 L n1m T m Equate the exponents of L and T so that the dimen- sional equation is balanced: n 1 m 5 1 and m 5 2 Solve the two equations for n: n 5 21 Write the acceleration expression: a 5 kr 2 1 v 2 5 k v 2 r In Section 4.4 on uniform circular motion, we show that k 5 1 if a consistent set of units is used. The constant k would not equal 1 if, for example, v were in km/h and you wanted a in m/s 2 . Example 1.2 Analysis of a Power Law Suppose we are told that the acceleration a of a particle moving with uniform speed v in a circle of radius r is propor- tional to some power of r, say r n , and some power of v, say v m . Determine the values of n and m and write the simplest form of an equation for the acceleration. S o L u t i o n Identify the dimensions of a from Table 1.5 and multiply by the dimensions of t: 3at4 5 L T 2 T 5 L T Therefore, v 5 at is dimensionally correct because we have the same dimensions on both sides. (If the expression were given as v 5 at 2 , it would be dimensionally incorrect. Try it and see!) ▸ 1.1 c o n t i n u e d Download 0.98 Mb. Do'stlaringiz bilan baham: 
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