SupposeA(m) =1+тAs discussed in class, A(m) approachese = 2.71828183...as m increases without bounds. This exercise illustrates that fact. You'll need to enter numerical values of e – A(m) that are correct to 4 digits (after theinitial zeros). You can compute them with your calculator, and you may find it convenient to use scientific format. Note how the difference of e and A(m)approaches zero, and A(m) approaches e as m grows.If you are curious you can see the first 10,000 digits of e here.e - А(1) —e – A(2) =e - А(10) —e - А(100) —e - A(1,000) =e - A(10, 000)e - A(100, 000)е —A(1, 000, 000)

Answered: Image /qna-images/answer/2bfa6efb-d4c7-4464-b938-7ecf76c760a5.jpg

Answered: Suppose m A(m) = ( 1+ m As discussed in…

Algebra and Trigonometry (6th Edition)

6th Edition

ISBN:9780134463216

Author:Robert F. Blitzer

Publisher:Robert F. Blitzer

ChapterP: Prerequisites: Fundamental Concepts Of Algebra

Section: Chapter Questions

Problem 1MCCP: In Exercises 1-25, simplify the given expression or perform the indicated operation (and simplify,...

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3. Calculate: 14.83 – 6.32 (a) 288 (13 + 5)? (b) 45 -4.62) – 1065e-15 9.3 4. Calculate: 24.5 + 64/3.52 + 8.3 - 12.53 76.4 – 28/15 log 1012890, 2 (b) (5.92 – 2.42)/3 +(05 1o2890 e03 5. Calculate: +tan sin(15°) (b) sin?80°- (cos 14° sin80°)2 V0.18 (a) cos 6. Define the variable x as x= 6.7, then evaluate: (a) 0.01x– 1.4x3 + 80x + 16.7 (b) 3 + e – 51/x 7. Define the variable t as t= 3.2, then evaluate: (a) 561-9.81 (b) 14e0.1'sin(2rt) 8. Define the variables x and y as x= 5.1 and y= 4.2, then evaluate: (a) -- (b) (xy)2 -*+y (x-y)|2 x+y 2x-y 9. Define the variables a, b, c, and d as: (a-b) За a = 12, b = 5.6, c - 62 and then evaluate: d-e (a) +-(d-b)2 d+e (b) ed-2b + In 10. A sphere has a radius of 24 cm. A rectangular prism has sides of a, a/2, and a/4. (a) Determine a of a prism that has the same volume as the sphere. (b) Determine a of a prism that has the same surface area as the sphere. a/4 a/2 a
2.4. Compute the following discrete logarithms. (a) log₂ (13) for the prime 23, i.e., p = 23, g = 2, and you must solve the congruence 2 = 13 (mod 23). (b) log₁0 (22) for the prime p = 47. (c) log627 (608) for the prime p = 941. (Hint. Look in the second column of Table 2.1 on page 64.)
9. 7. Expand log00x V- as much as possible. Evaluate expressions without a calculator where 3(x+7)2 possible. You may not change the base.
4. Compute the following expressions by hand. Simplify as much as possible. (a) 27 logs(16) (b) log6()- logs(2) + logs(16)
Given that √p = 5 √q , the value of [log (p)^(-1) - log (q)^(-1)] correct to 3 decimal places equals: - 1.398 0.2 0.699 - 0.278 0.278 - 0.2 5 1.398 2.796 - 2.796

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