Physics majors would probably take these, plus a semester of fourier transform, and perhaps a semester of numerical methods. Business majors and some of the social sciences had a 2-semester "baby calculus". If you try to transfer credits from one school system to another, then they have a transcript office that will have you have your old school send the course description that describes exactly what topics you covered.
Then they will compare this to their courses, and decide what they will give you credit for. You could do this yourself to get a good idea of what credit you would get -- get course descriptions of what you already took, compare to descriptions in the course catalog where you are going.
Some universities go offer more complicated classes specializing in differential equation's. There are also other types of calculus like vector calculus, tensor calculus, differential geometry applying calculus to geometry and there are many others.
Your email address will not be published. Save my name, email, and website in this browser for the next time I comment. The course takes the ideas from Calculus 1 and 2 and moves them from two dimensions to three and higher! Calc 3 is offered every semester. Which course is right for you? Calculus I, Math ? Calculus II, Math ? This is a bit more complicated because there are many ways to prepare for Calculus II.
Advanced Placement? Calculus AB exam. If made a 4 or a 5, you should sign up for Calculus II, Math If you scored 3 or less, you should sign up for Calculus I, Math IBHL Math? If you made a 5, 6, or 7, you should sign up for Calculus II, Math Limits and continuity.
Limits intro : Limits and continuity Estimating limits from graphs : Limits and continuity Estimating limits from tables : Limits and continuity Formal definition of limits epsilon-delta : Limits and continuity Properties of limits : Limits and continuity Limits by direct substitution : Limits and continuity Limits using algebraic manipulation : Limits and continuity Strategy in finding limits : Limits and continuity. Squeeze theorem : Limits and continuity Types of discontinuities : Limits and continuity Continuity at a point : Limits and continuity Continuity over an interval : Limits and continuity Removing discontinuities : Limits and continuity Infinite limits : Limits and continuity Limits at infinity : Limits and continuity Intermediate value theorem : Limits and continuity.
Derivatives: definition and basic rules. Average vs. Derivatives: chain rule and other advanced topics. Chain rule : Derivatives: chain rule and other advanced topics More chain rule practice : Derivatives: chain rule and other advanced topics Implicit differentiation : Derivatives: chain rule and other advanced topics Implicit differentiation advanced examples : Derivatives: chain rule and other advanced topics Differentiating inverse functions : Derivatives: chain rule and other advanced topics Derivatives of inverse trigonometric functions : Derivatives: chain rule and other advanced topics.
Strategy in differentiating functions : Derivatives: chain rule and other advanced topics Differentiation using multiple rules : Derivatives: chain rule and other advanced topics Second derivatives : Derivatives: chain rule and other advanced topics Disguised derivatives : Derivatives: chain rule and other advanced topics Logarithmic differentiation : Derivatives: chain rule and other advanced topics Proof videos : Derivatives: chain rule and other advanced topics.
Applications of derivatives.
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