Curve Fitting Learning Objective: to fit data to non-linear functions and make predictions Warm-up (IN) 1.Find all the critical points for 2.Solve by factoring.

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Presentation transcript:

Curve Fitting Learning Objective: to fit data to non-linear functions and make predictions Warm-up (IN) 1.Find all the critical points for 2.Solve by factoring

Notes! Ex 1 – Brian wanted to determine the relation that might exist between speed and miles per gallon of an automobile. Let x be the average speed of a car on the highway measured in miles per hour and let y represent the miles per gallon of the automobile. The following data are collected: a. Find the regression equation for the data. b. Explain what the slope means. c. Predict the miles per gallon of a car traveling 61 miles per hour.

Ex 2 – The data below represents the average fuel consumption, C, by cars (in billions of gallons) for the years, t, a. Find the regression equation for the data. b. Determine the year in which average fuel consumption was lowest. c. Predict the average fuel consumption for t‘80‘81‘82‘83‘84‘85‘86‘87‘88‘89‘90‘91‘92‘93 C

Ex 3 – The data below represents monthly cost of manufacturing bicycles, C, and the number of bicycles produced, x. a. Find the regression equation for the data. b. Determine the cost of manufacturing 230 bicycles. c. How many bicycles can be produced if costs are equal to $55,000? x C10,00030,00039,00043,95047,82550,07550,85053,32557,75060,67565,075

HW – curve fitting wksht Out – none Summary – describe the difference between a linear, quadratic and cubic graph Don’t forget about POW!!