Kilgo Lesson Plan format
... Engage and connect Derivative practice Guided instruction – We will practice using a worksheet from a Rice institute on Fundamental Theorem of Calculus This worksheet focuses on AP style questions that ask the student to use the concept of the fundamental theorem and not just evaluating an antid ...
... Engage and connect Derivative practice Guided instruction – We will practice using a worksheet from a Rice institute on Fundamental Theorem of Calculus This worksheet focuses on AP style questions that ask the student to use the concept of the fundamental theorem and not just evaluating an antid ...
Mean Value Theorem by Nihir Shah
... You must be like “what in the world is this?” Allow me to explain in simple terms: ...
... You must be like “what in the world is this?” Allow me to explain in simple terms: ...
A SIMPLE COMPLEX ANALYSIS AND AN ADVANCED CALCULUS
... It is hard not to have Ray Redheffer’s title of [2] as a reaction to another article on the Fundamental Theorem of Algebra. In fact at least 28 notes have appeared in this Monthly about this theorem. In this note we present nevertheles two proofs of the Fundamental Theorem of Algebra, which do not s ...
... It is hard not to have Ray Redheffer’s title of [2] as a reaction to another article on the Fundamental Theorem of Algebra. In fact at least 28 notes have appeared in this Monthly about this theorem. In this note we present nevertheles two proofs of the Fundamental Theorem of Algebra, which do not s ...
Fundamental theorem of calculus part 2
... difference between a and b". Formally, you'll see f(x)=steps(x) and F(x)=Original(x) Why is this cool? The definite integral is a gritty mechanical computation, and the indefinite integral is a nice, clean formula. Just take the difference between the endpoints to know the net result of what happene ...
... difference between a and b". Formally, you'll see f(x)=steps(x) and F(x)=Original(x) Why is this cool? The definite integral is a gritty mechanical computation, and the indefinite integral is a nice, clean formula. Just take the difference between the endpoints to know the net result of what happene ...
Course Narrative
... • Points of inflection as places where concavity changes Applications of derivatives • Analysis of curves, including the notions of monotonicity and concavity • Optimization, both absolute (global) and relative (local) extrema • Modeling rates of change, including related rates problems • Use of imp ...
... • Points of inflection as places where concavity changes Applications of derivatives • Analysis of curves, including the notions of monotonicity and concavity • Optimization, both absolute (global) and relative (local) extrema • Modeling rates of change, including related rates problems • Use of imp ...
CalculusLecture-384H.pdf
... variables x, y , dx and dy . Just for the record, the denition above gives rise to a kind of chain rule for certain functions of two arguments. Suppose that we know that x = x (t) and y = y (t) are both functions of t, so that f = f (x (t) , y (t))is really a function of the single independent vari ...
... variables x, y , dx and dy . Just for the record, the denition above gives rise to a kind of chain rule for certain functions of two arguments. Suppose that we know that x = x (t) and y = y (t) are both functions of t, so that f = f (x (t) , y (t))is really a function of the single independent vari ...
Fundamental theorem of calculus
The fundamental theorem of calculus is a theorem that links the concept of the derivative of a function with the concept of the function's integral.The first part of the theorem, sometimes called the first fundamental theorem of calculus, is that the definite integration of a function is related to its antiderivative, and can be reversed by differentiation. This part of the theorem is also important because it guarantees the existence of antiderivatives for continuous functions.The second part of the theorem, sometimes called the second fundamental theorem of calculus, is that the definite integral of a function can be computed by using any one of its infinitely-many antiderivatives. This part of the theorem has key practical applications because it markedly simplifies the computation of definite integrals.