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    where m0 is the rest mass of the particle and c is the speed of light in a vacuum. Find the inverse function of f and explain its meaning. Solution. We simply solve for v: m= m0 1− v 2 /c2 =⇒ m 1 − v 2 /c2 = m0 =⇒ m2 1 − v2 c2 = m2 0 m2 v2 =⇒ 1 − 2 = 0 c m2 =⇒ v2 m2 =1− 0 c2 m2 m0 m m0 m 2 =⇒ v 2 = c2 1 − 2 =⇒ v = ±c 1 − Our new function v(m) gives velocity v as a function of m. In particular‚ v(m) gives the velocity (as measured by a relatively stationary observer) that

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    Inverse In this week’s assignment‚ I will be solving functions with different values and variables. Many companies and businesses‚ use these methods to either make progress or to change something that will benefit their success. The first function is: (f – h)(4) f(4) – h(4) I multiplied 4 with each variable. f(4) = 2(4) + 5 The x is replaced with 4. f(4) = 13 I used the order of operation to evaluate this function. h(4) = (7 – 3)/3 I will repeat the steps that I used

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    BUSINESS MATHEMATICS: ASSIGNMENT - “Section” 5.1‚ page 182. (1) Write the general form of a linear function involving five independent variables. (2) Assume that the salesperson in Example 1 (page 177) has a salary goal of $800 per week. If product B is not available one week‚ how many units of product A must be sold to meet the salary goal? If product A is unavailable‚ how many units be sold of product B? (3) Assume in Example 1 (page 177) that the salesperson receives a bonus when combined

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    and Logarithmic Functions 2.2 Logarithmic Functions MATH14 • Logarithmic Function with base b • Graph of Logarithmic Function • Natural Logarithmic Function • Properties of Logarithmic Functions • Exponential and Logarithmic Equations Logarithmic Function with base b Definition: The logarithmic function with base b is the inverse of the exponential function with base b. y  logb x Note: Dom  f   if and only if  x b y Rng  f   Logarithmic Function with base b Examples:

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    HADNOUT E.13 - EXAMPLES ON TRANSFER FUNCTIONS‚ POLES AND ZEROS Example 1 Determine the transfer function of the mass-spring-damper system. The governing differential equation of a mass-spring-damper system is given by m x + c x + kx = F . Taking the Laplace transforms of the above equation (assuming zero initial conditions)‚ we have ms 2 X ( s ) + csX ( s ) + kX ( s ) = F ( s )‚ X ( s) 1 ⇒ = . 2 F ( s ) ms + cs + k Equation (1) represents the transfer function of the mass-spring-damper system. Example

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    6-1 Inverse Trig Functions p. 468: 1-31 odd I. Inverse Trig Functions A. [pic] B. [pic] C. [pic] Find the exact value of each expression 1. [pic] 2. [pic] 3. [pic] 4. [pic] 5. [pic] 6. [pic] Use a calculator to find each value. 7. [pic] 8. [pic] 9. [pic] Find the exact value of each expression. 10. [pic] 11. [pic] 12. [pic] 6-2 Inverse Trig Functions Continued p. 474:1-41

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    Student Activity A Generic Function Use the generic graph of f(x) with domain [–6‚ –3] and [–2‚ 6] to answer the questions below. 7 Y 6 5 4 3 2 1 X -7 -6 -5 -4 -3 -2 -1 0 -1 1 2 3 4 5 6 7 -2 -3 -4 -5 -6 -7 1. What is the range of f(x)? 2. What is the domain? 3. On what intervals is f(x) decreasing? 4. On what intervals will the following statements be true? a) As x increases‚ y increases. b) As x increases

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    AP Calculus Name ____________________________ Period _____ Functions Defined by Integrals The graph below is‚ the derivative of. The graph consists of two semicircles and one line segment. Horizontal tangents are located at and and a vertical tangent is located at. 1. On what interval is increasing? Justify your answer. 2. For what values of x does have a relative minimum? Justify. 3. On what intervals is concave up? Justify 4. For what values of x is undefined? 5. Identify

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    CENTRAL LUZON STATE UNIVERSITY SCIENCE CITY OF MUNOZ COLLEGE OF ARTS AND SCIENCE DEPARTMENT OF PSYCHOLOGY (MATURATION VS. EXPERIENCE) (CONTINUITY VS. DISCINTINUITY) (STABILITY VS. CHANGE) MATURATION VERSUS EXPERIENCE DEVELOPMENT MATURATION  the emergence of personal and behavioral characteristics through growth process. EXPERIENCE  knowledge of or skill of something or some event gained through involvement in or exposure to that thing or event

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    trigonometric functions: sin (x)‚ cos (x)‚ tan(x)‚ cot (x)‚ sec (x) and csc (x) include the domain‚ range‚ period‚ asymptotes and amplitudes. The domain of a cosine and sine function is all real numbers and the range is -1 to 1. The period is 2π‚ and the amplitude is 1. They have no asymptotes. The domain of tangent is all real numbers except for π2+kπ. The range is all real numbers and the period is π. Tan has no amplitude and has asymptotes when x= π2+kπ. The domain of a secant function is all real

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