1. Derivatives differ from integrals by a. Derivative of a function represent the slope of the curve at any given point, while integral represent the area under the curve. b. Derivative of a function represent the area under the curve while integral represent the slope of the curve at any given point. c. Derivative of a function defines instantaneous rate of change at a given point while integral represents the rate of change. d. Derivative of a function is a way of adding slices to find the whole while integral represents an accumulation or sum of a function over a range. 2. A rectangular array of numbers used to compactly write and work with multiple linear equations. a. Elements 3. A method based on the idea of successive approximations starting with one or two initial approximations to the root and obtain a sequence of approximations. a. Direct method b. equations c. matrix d. solutions b. Iterative method c. factoring method d. elimination method
1. Derivatives differ from integrals by a. Derivative of a function represent the slope of the curve at any given point, while integral represent the area under the curve. b. Derivative of a function represent the area under the curve while integral represent the slope of the curve at any given point. c. Derivative of a function defines instantaneous rate of change at a given point while integral represents the rate of change. d. Derivative of a function is a way of adding slices to find the whole while integral represents an accumulation or sum of a function over a range. 2. A rectangular array of numbers used to compactly write and work with multiple linear equations. a. Elements 3. A method based on the idea of successive approximations starting with one or two initial approximations to the root and obtain a sequence of approximations. a. Direct method b. equations c. matrix d. solutions b. Iterative method c. factoring method d. elimination method
Chapter2: Loads On Structures
Section: Chapter Questions
Problem 1P
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