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"Designed to provide a flexible supplement to a course in freshman calculus. It is useful for self-study, for free exploration of topics and for the solution of problems, and for classroom demonstrations. The program consists of one general purpose routine useful throughout the course, and eight specialized routines: 1) Limits computes the limit f(x) as x approaches a. Tangent computes the formula for the tangent line to y=f(x) at the x=a. 3) Min/Max finds critical points of f(x). 4) Area computes the integral of f(x) from a to b. 5) L'Hopital shows the application of L'Hopital's Rule by carrying out the calculations step by step. 6) Parameter plots a curve given in the parametric form x=f(t). 7) Taylor computes the first few terms of the Taylor series of f(x) in a specified interval [-r, r]. (8) Differential Equations handles second order linear homogenous differential equations."@en
"Designed to provide a flexible supplement to a course in freshman calculus. It is useful for self-study, for free exploration of topics and for the solution of problems, and for classroom demonstrations. The program consists of one general purpose routine useful throughout the course, and eight specialized routines: 1) Limits computes the limit f(x) as x approaches a. Tangent computes the formula for the tangent line to y=f(x) at the x=a. 3) Min/Max finds critical points of f(x). 4) Area computes the integral of f(x) from a to b. 5) L'Hopital shows the application of L'Hopital's Rule by carrying out the calculations step by step. 6) Parameter plots a curve given in the parametric form x=f(t). 7) Taylor computes the first few terms of the Taylor series of f(x) in a specified interval [-r, r]. 8) Diffecq handles second order linear homogeneous differential equations."@en
"Designed to provide a flexible supplement to a course in freshmen calculus."@en
"Designed to provide a flexible supplement to a course in freshmen calculus."
"Designed to provide a flexible supplement to a course in freshmen calculus. It is useful for self-study, for free exploration of topics, for the solution of problems, and for classroom demonstrations. The program consists of one general purpose routine useful throughout the course, and eight specialized routines: 1) Limits computes the limit f(x) as x approaches a. 2) Tangent computes the formula for the tangent line to y=f(x) at the x=a. 3) Min/Max finds critical points of f(x). 4) Area computes the integral of f(x) from a to b. 5) L'Hopital shows the application of L'Hopital's Rule by carrying out the calculations step by step. 6) Parameter plots a curve given in the parametric form x=f(t). 7) Taylor computes the first few terms of the Taylor series of f(x) in a specified interval [-r, r]. 8) Diffecq handles second order linear homogeneous differential equations."@en
"Designed to provide a flexible supplement to a course in freshman calculus. It is useful for self-study, for free exploration of topics and for the solution of problems, and for classroom demonstrations. The program consists of one general purpose routine useful throughout the course, and eight specialized routines including: 1) Limits computes the limit f(x) as x approaches a. Tangent computes the formula for the tangent line to y=f(x) at the point x=a. 3) Min/Max finds the critical points of f(x). 4) Area computes the integral of f(x) from a to b. 5) L'Hopital shows the application of L'Hopital's Rule by carrying out the calculations step by step. 6) Parameter plots a curve given in the parametric form x=f(t). 7) Taylor computes the first few terms of the Taylor series of f(x) in a specified interval [-r, r]. 8) Differential Equations handles second order linear homogenous differential equations."
"Designed to provide a flexible supplement to a course in freshman calculus. It is useful for self-study, for free exploration of topics and for the solution of problems, and for classroom demonstrations. The program consists of one general purpose routine useful throughout the course, and eight specialized routines including: 1) Limits computes the limit f(x) as x approaches a. Tangent computes the formula for the tangent line to y=f(x) at the point x=a. 3) Min/Max finds the critical points of f(x). 4) Area computes the integral of f(x) from a to b. 5) L'Hopital shows the application of L'Hopital's Rule by carrying out the calculations step by step. 6) Parameter plots a curve given in the parametric form x=f(t). 7) Taylor computes the first few terms of the Taylor series of f(x) in a specified interval [-r, r]. 8) Differential Equations handles second order linear homogenous differential equations."@en

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