Is the derivative of a polynomial is always a polynomial? what about the derivative of a...

Reflect on the concept of polynomial and rational functions. What concepts (only the names) did you...

Reflect on the concept of polynomial and rational functions. What concepts (only the names) did you need to accommodate these concepts in your mind? What are the simplest polynomial and rational function you can imagine? In your day to day, is there any occurring fact that can be interpreted as polynomial and rational functions? What strategy are you using to get the graph of polynomial and rational functions? The Learning Journal entry should be a minimum of 400 words and...

Take a derivative of the equation for y with respect to t. The variable x is...

Take a derivative of the equation for y with respect to t. The variable x is to be taken as constant. Use the chain rule in which you take a derivative first of the function and then of the argument. y = ym sin(kx - ωt + φ).

if f(x) is a polynomial function, does (1/f(x)) always have a vertical asymptote? if yes, explain...

if f(x) is a polynomial function, does (1/f(x)) always have a vertical asymptote? if yes, explain why. if no, provide a counter-example and justify your choice.

Question about Runge's phenomenon For higher order interpolating polynomial why oscillation is not occur at mid-point...

Question about Runge's phenomenon For higher order interpolating polynomial why oscillation is not occur at mid-point and why it becomes severe near end-point? Most texts say just it is because of Runge's Phenomenon , and the derivative of polynomial is large as n increases so the graph oscillates, but I cannot understand these.

Please type in answer, do not sent pic of written job !!!!! What concepts (only the...

Please type in answer, do not sent pic of written job !!!!! What concepts (only the names) did you need to accommodate these concepts in your mind? What are the simplest polynomial and rational function you can imagine? In your day to day, is there any occurring fact that can be interpreted as polynomial and rational functions? What strategy are you using to get the graph of polynomial and rational functions?

3a. What is the importance of the Fundamental Algebra Theorem and the Existence Theorem? 3b. The...

3a. What is the importance of the Fundamental Algebra Theorem and the Existence Theorem? 3b. The graph of rational function may have asymptote(s), while the graph of a polynomial function cannot have any asymptotes. Why do you think it is so?

1) Write and answer a question that asks to solve an equation that involves an logarithmic...

1) Write and answer a question that asks to solve an equation that involves an logarithmic function. That is, your unknown must be in a logarithmic function so that you must use inverse operations (including exponentiation) to solve for it. Your solution must include an exact answer, not a decimal approximation. 2) Write and answer a question that asks you to find the derivative of the sum or difference of at least three functions. Your question and solution must demonstrate...

What is the 2nd order Taylor polynomial of the function f (x) = sqrt(x) at point...

What is the 2nd order Taylor polynomial of the function f (x) = sqrt(x) at point a = 4? Please solve it!!!

DNA replication is always 5' to 3'. Explain what 5' to 3' means with respect to...

DNA replication is always 5' to 3'. Explain what 5' to 3' means with respect to nucleotide subunits. Explain what activity of DNA polymerase necessitates that replication be 5' to 3' rather than 3' to 5'? What problems do you envision with 3’ to 5’ direction of DNA chain growth?

The change in water level of a lake is modeled by a polynomial function, W(x). Describe...

The change in water level of a lake is modeled by a polynomial function, W(x). Describe how to find the x-intercepts of W(x) and how to construct a rough graph of W(x) so that the Parks Department can predict when there will be no change in the water level. You may create a sample polynomial to be used in your explanations.