Web(Enter your answers using interval notation.) domain (-3, 4) (-2, 4) range (c) Find the values of x for which h(x) = 3. (Enter your answers as a comma-separated list.) X = 2 (d) Find … WebFeb 20, 2024 · Functions can be represented using equations. The net difference between both function values is 12; The average rate of change is 12; The function is given as: (a) Net change at t = -1 and t = 2. First, we calculate h(-1) and h(2) So, the net difference between both is:. Hence, the net difference between both function values is 12 (b) The …
5.4 Integration Formulas and the Net Change Theorem
WebQuotient Rule In calculus, the quotient rule is a method of finding the derivative of a function that is the ratio of two differentiable functions. Let h (x)=f (x)/g (x), where both f and g are differentiable and g (x)≠0. The quotient rule states that the derivative of h (x) is hʼ (x)= (fʼ (x)g (x)-f (x)gʼ (x))/g (x)². WebOct 15, 2024 · To find the net change, use the following equation: $125 - $150 , making the net change -$25 . To determine the net change in percentages, use this equation: [ (current closing price - previous closing price)/previous closing price] x 100 . incompliance ohio
Answered: (e) Find the net change in h between x… bartleby
WebJun 25, 2024 · f (x) = 3-3x**2; x1=2, x2=2+h (a) net change of f (x): f1= f (x=2) = 3-3*4 = -9 f2= f (x=2+h) = 3-3 (2+h)**2 = 3-3 (h**2+4h+4) = 3-3h**2-12h-12 = -3h**2-12h-9 net change = f2 - f1 = (-3h**2-12h-9)- (-9) = -3h**2-12h = -3h (h+4) (b) avg rate of change = slope = (f2 - f1)/ (x2-x1) = -3h (h+4)/ (2+h-2) = -3 (h+4) Upvote • 0 Downvote Add … WebThe manager of a furniture factory finds that it costs $2200 to produce 100 chairs in one day and$4800 to produce 300 chairs in one day. (a) Assuming that the relationship between cost and the number of chairs produced is linear, find a linear function C that models the cost of producing x chairs in one day. WebSep 7, 2024 · Example 5.4.1: Integrating a Function Using the Power Rule. Use the power rule to integrate the function ∫4 1√t(1 + t)dt. Solution. The first step is to rewrite the function and simplify it so we can apply the power rule: ∫4 1√t(1 + t)dt = ∫4 1t1 / 2(1 + t)dt = ∫4 1(t1 / 2 + t3 / 2)dt. Now apply the power rule: incompliance of our policy