微積分
極限、導関数、最適化、関数挙動。
-
find the given higher - order derivative. $f(x)=x^{3}-x^{3}/4,f^{(3)}(x…
$\frac{9}{2}x$
-
determine the point at which the graph of the function has a horizontal…
$(3,\frac{1}{3})$
-
use the rules of differentiation to find the derivative of the function…
$-\frac{3}{x^{2}}-17\sec(x)\tan(x)$
-
find the derivative of the algebraic function. f(x) = \\frac{2x - 3}{\\…
$\frac{2x + 3}{2x\sqrt{x}}$
-
13. congress limits the power of the president chiefly by funding/winni…
13. funding 14. the entire law 15. enhanced 16. There may be increased political gridlock as they have different agendas and may struggle to pass legislation.
-
for the function g whose graph is given, state the following. (if the a…
(a) $N$ (b) $I$ (c) (a real - number value, not applicable in the given symbol set) (d) $D$ (e) (a real - number value, not applicable in the given symbol set) (f) $x=-2$, $x = 0$…
-
find the derivative of the algebraic function. f(x)=\frac{x^{2}+13x + 3…
$\frac{-13x^{2}-234x - 1053}{(x^{2}-81)^{2}}$
-
find the given higher - order derivative. $f(x)=x^{3}-x^{3/4}, f^{(3)}(…
$\frac{9x}{2}$
-
find the given higher - order derivative. f(x)=x^{3}-x^{3}/4,f^{(3)}(x)…
$\frac{9x}{2}$
-
for what value of c is the function defined below continuous on $(-\\in…
$-2$
-
consider the equation and the given point. $f(x)=(x^{3}+9x - 1)(x - 2),…
$y=-3x - 6$
-
use the quotient rule to find the derivative of the function. f(x)=\fra…
$\frac{6x^{\frac{3}{2}}+2x}{(4\sqrt{x}+1)^{2}}$
-
which of the following are the ideas (or assumptions) underlying the pp…
Fixed resources, Fixed technology
-
what is one limitation to how effective advocacy organizations can be i…
1. the amount of resources required to influence policy 2. eliminating free riders to address the collective action problem
-
suppose a function $f$ is continuous on $0,1$, except at $x = 0.25$ and…
n
-
what is one trade - off that an interest group makes when they offer a …
1. spending money on incentives instead of directly on the cause 2. Time and money are diverted from the mission
-
which factor influences how advocacy organizations prioritize issues? a…
the need to align with the interests of members who can offer more resources
-
let f be the function below. you may click on the graph to make it larg…
(Assuming the vertical asymptotes are at $x=- 1$ and $x = 1$) $(-\infty,-1)\cup(-1,1)\cup(1,\infty)$ (The actual intervals should be determined precisely based on the exact $x$ - …
-
6. calculator active. estimate the rate of change of f(x)=x^2 - x at x …
-3
-
let $f(x)=sqrt{64 - x}$. compute $f(0)$ using the limit definition $f(0…
$f^{\prime}(0)=-\frac{1}{16}$ $y=-\frac{1}{16}x + 8$
-
4. calculator - active. find the average rate of change of the function…
$\frac{\sqrt{5}-\sqrt{21}}{4}$
-
if $f(x)=2 + 7x-2x^{2}$, find $f(1)$.
3
-
if $f(x)=\frac{3}{x^{2}}$, find $f(4)$.
$-\frac{3}{32}$
-
what is the average rate of change for each function on the given inter…
8. -1 9. 11
-
state if the following functions are even, odd, or neither. 30. $f(x)=4…
30. The function $f(x) = 4x^{7}+5x^{3}-2x$ is odd. 31. The function $f(x)=7 - 6x^{4}-3x^{2}$ is even. 32. $\lim_{x\to\infty}p(x)=-\infty$, $\lim_{x\to-\infty}p(x)=\infty$ 33. $\li…
-
10 multiple choice 2 points what major construction was largely complet…
10. The Great Wall 11. Keep up to date with new technology
-
practice exercises 11 - 22. trigonometric limits use theorem 3.10 to ev…
11. $3$ 12. $\frac{5}{3}$ 13. $\frac{7}{3}$ 14. $\frac{3}{4}$ 15. $5$ 16. $0$ 17. $7$ 18. $0$ 19. $\frac{1}{4}$ 20. $\frac{1}{2}$
-
what is one socially responsible action that people can take when theyr…
1. Seek out more stories presented about the issue as a whole. 2. It implies that a story has only two sides.
-
homework2: problem 17 (1 point) evaluate the limit $lim_{x ightarrow0}\…
$\frac{7}{3}$
-
question 25 2.5 pts the type of jurisdiction that gives the court autho…
C. in rem jurisdiction
-
homework2: problem 16 (1 point) evaluate $lim_{\theta ightarrow0}\frac{…
$0$
-
homework2: problem 15 (1 point) evaluate $lim_{x \to 3} \frac{sin(x - 3…
$\frac{1}{9}$
-
homework2: problem 14 (1 point) evaluate lim_{h→0} (f(5 + h)-f(5))/h, w…
5
-
homework2: problem 13 (1 point) evaluate the limit: $lim_{t ightarrow -…
$\frac{1}{2}$
-
peremptory challenges: require specific reasons for use. are challenges…
are generally limited in each case.
-
homework2: problem 12 (1 point) evaluate the limit: $lim_{x ightarrow16…
$\frac{1}{8}$
-
most states have a lesser court that allows the participation of lawyer…
claims courts.
-
homework2: problem 11 (1 point) results for this submission 2 of the an…
$\frac{1}{4\sqrt{2}}$
-
use a graphing calculator and a system of equations to find the roots o…
$-2,0$
-
the time limit for a defendant to file an answer is: the statute of lim…
20 to 30 days in most states.
-
part 1: evaluate the limit. evaluate the following limit by simplifying…
$4\sqrt{2}$
-
bringing books to people when mary lemist titcomb became the first libr…
In her quest to expand library access, Mary Titcomb designed the first mobile library.
-
practice exercises 11 - 22. trigonometric limits use theorem 3.10 to ev…
1. **For problem 11: $\lim_{x ightarrow0}\frac{\sin3x}{x}$** - **Explanation**: - **Step 1: Use the limit - formula $\lim_{u ightarrow0}\frac{\sin u}{u}=1$** - Let $u = 3x$. As $x…
-
what is an example of reporting through an episodic frame? an in - dept…
1. C. coverage of a natural disaster that highlights the personal stories of those affected 2. A. It may reduce awareness of broader social issues
-
political issues in the media? it has improved the depth and accuracy o…
It has led to a decrease in exposure to diverse political opinions
-
part i - communication and understanding 1. answer any two of the follo…
The average rate of change of a function $y=f(x)$ over $[a,b]$ is $\frac{f(b)-f(a)}{b - a}$, giving an overall change rate on the interval. The instantaneous rate of change at $x …
-
you come across the following question while participating in a politic…
separate each issue into individual questions
-
what is the function $u$? answer: $u = 2x^{2}$ what is $du$? answer: $d…
$\int\frac{2x^{3}dx}{\sqrt{2 + 4x^{2}}}=\frac{1}{6}(x^{2}-1)\sqrt{2 + 4x^{2}}+C$
-
integrate $int sqrt{6x - 1} , dx$ using a table of integrals table of i…
\(\frac{1}{9}(6x - 1)^{\frac{3}{2}}+C\)
-
use a table of integrals to evaluate the integral. $int e^{5x}sin(3x)dx…
$\frac{e^{5x}}{34}(5\sin(3x)-3\cos(3x))+C$
-
evaluate $int sec^{3}x\tan^{3}x dx$
$\frac{\sec^{5}x}{5}-\frac{\sec^{3}x}{3}+C$
-
evaluate $intsec^{3}x\tan^{5}x dx$ +c
$\frac{\sec^{7}x}{7}-\frac{2\sec^{5}x}{5}+\frac{\sec^{3}x}{3}+C$
-
hw part 1: 7.2 trigonometric integrals score: 3.5/8 answered: 5/8 progr…
$\frac{\tan^{5}x}{5}+\frac{\tan^{7}x}{7}+C$
-
question 6 of 10 which theme best represents bradburys story the pedest…
D. Humans will lose touch with one another if they allow technology to dominate their lives.
-
evaluate $int \tan^{4}xsec^{6}x dx$
$\frac{\tan^{5}x}{5}+\frac{2\tan^{7}x}{7}+\frac{\tan^{9}x}{9}+C$
-
17. $t^{2}\frac{dy}{dt}+y^{2}=ty$
$y = \frac{t}{\ln|t|+C}$
-
compute the given integral. $intsin^{5}x dx=$ $+c$
$-\cos x+\frac{2\cos^{3}x}{3}-\frac{\cos^{5}x}{5}+C$
-
question 23 find the horizontal asymptote of $f(x)=\frac{-4x^{7}+x}{3x^…
DNE
-
27. $int_{\frac{1}{2}}^{3}(2 - \frac{1}{x})dx$
$5-\ln6$
-
question 34 1 pts melzacks view that neurons in the spine can simultane…
True
-
hw part 1: 7.2 trigonometric integrals score: 0/8 answered: 0/8 progres…
$\frac{\sin^{3}x}{3}-\frac{\sin^{5}x}{5}+C$
-
consider the following curve. $y = \\frac{x - 1}{x + 1}$ find $y(x)$. $…
$y=\frac{1}{2}x-\frac{1}{2},y=\frac{1}{2}x+\frac{7}{2}$
-
consider the following curve. $y = \\frac{x - 1}{x + 1}$ find $y(x)$. $…
$\frac{2}{(x + 1)^{2}}$
-
find the derivative of the function below. $f(x)=arcsin(sqrt{1 - x^{6}}…
$\frac{-3x^{2}}{\sqrt{1 - x^{6}}},|x|\lt1,x eq0$
-
suppose that f(5) = 1, f(5) = 9, g(5) = -5, and g(5) = 7. find the foll…
(a) \(-38\) (b) \(-\frac{52}{25}\) (c) \(52\)
-
10. -/1 points if f(x) = \\frac{x^{2}}{4 + x}, find f(2). f(2) =
$\frac{4}{27}$
-
consider the following curve. $y = \\frac{1 + x}{4 + e^{x}}$ find $y(x)…
$y'(x)=\frac{4-xe^{x}}{(4 + e^{x})^{2}}$ $y=\frac{4}{25}x+\frac{1}{5}$
-
use integration by parts to evaluate the integral: $int sin(ln(6x))dx$
\(\frac{1}{2}x(\sin(\ln(6x)) - \cos(\ln(6x)))+C\)
-
find f(x) and f(x). f(x) = \\frac{x}{x^{2}-6} f(x) = f(x) =
$f'(x)=\frac{-x^{2}-6}{(x^{2}-6)^{2}}$ $f''(x)=\frac{2x(x^{2}+18)}{(x^{2}-6)^{3}}$
-
compute the given integral. $int 6x^{3}e^{3x}dx=$ $+c$
$2x^{3}e^{3x}-2x^{2}e^{3x}+\frac{4}{3}xe^{3x}-\frac{4}{9}e^{3x}+C$
-
differentiate. f(x)=\frac{x^{4}e^{x}}{x^{4}+e^{x}} f(x)= square resourc…
$\frac{x^{8}e^{x}+4x^{3}e^{2x}}{(x^{4}+e^{x})^{2}}$
-
find the tangent line to y = \\sqrt{x^{2}-x + 7} at x = 7. the tangent …
$y=\frac{13}{14}x+\frac{1}{2}$
-
$\\int\\cos(7x)^{3}dx =$
$\frac{1}{7}\sin(7x)-\frac{1}{21}\sin^{3}(7x)+C$
-
find the value of (f ∘ g) at the given value. f(u)=u^5 - 3, u = g(x)=\\…
$\frac{5}{2}$
-
find y. y = x(2x + 1)^4
$16(2x + 1)^2(5x + 1)$
-
find y. y = \\frac{1}{36} \\tan(6x + 5) y = \\square
$2\sec^{2}(6x + 5)\tan(6x + 5)$
-
read the excerpt from \take the tortillas out of your poetry.\ for me, …
Anaya speaks about everyone's right to read what they choose in order to appeal to the reader's sense of fairness.
-
read the excerpt from amy tans essay \mother tongue\. i know this for a…
to inform readers based on Tan's childhood experience
-
find $\frac{dy}{dt}$. $y = cos(\tan(3t - 2))$ $\frac{dy}{dt}=square$
$-3\sec^{2}(3t - 2)\sin(\tan(3t - 2))$
-
find the derivative of the given function. y = cos (e^{-2\theta^{2}}) \…
$4\theta e^{-2\theta^{2}}\sin(e^{-2\theta^{2}})$
-
find the derivative of the given function. q = sin(\\frac{t}{\\sqrt{t +…
$\frac{t + 10}{2(t + 5)^{\frac{3}{2}}}\cos(\frac{t}{\sqrt{t + 5}})$
-
recently, yanni has found his workouts to be too easy. he really wants …
progression
-
find the derivative of the function. f(x) = \\sqrt{6 + x\\sec x} \\frac…
\(\frac{x\sec x\tan x+\sec x}{2\sqrt{6 + x\sec x}}\)
-
find the derivative of the function. y = xe^{-5x}-4e^{x^{2}} \frac{dy}{…
$e^{-5x}-5xe^{-5x}-8xe^{x^{2}}$
-
find the derivative of the given function. y = x^2 sin^9 x + x cos^(-3)…
$2x\sin^{9}x + 9x^{2}\sin^{8}x\cos x+\cos^{-3}x+3x\cos^{-4}x\sin x$
-
find the derivative of the function y = (csc x + cot x)^(-1). \frac{dy}…
$\frac{\csc x}{\csc x+\cot x}$
-
find the derivative of the function y = √(-8 + 9x). \frac{dy}{dx}=square
$\frac{9}{2\sqrt{-8 + 9x}}$
-
read the excerpt from amy tans essay \mother tongue.\ i know this for a…
C. conversational
-
current attempt in progress use the figure to fill in the blanks in the…
(a) $f(7)=3$ (b) $f^{\prime}(7)=4$
-
for the function shown in the figure below, at what labeled points is t…
Positive slope at $C$ and $D$. Negative slope at $B$ and $F$. Greatest slope at $D$. Least slope at $F$.
-
current attempt in progress in a time of (t) seconds, a particle moves …
(i) $12.6$ (ii) $12.06$ (iii) $12.006$ (b) $12$
-
current attempt in progress (a) using the table below, find the average…
(a) The average rate of change is approximately $0.082$ billion people per year. (b) $f'(2012)=0.125$ billion people per year.
-
for the function shown in the figure below, at what labeled points is t…
Positive slope at \(A\) and \(D\). Negative slope at \(B\), \(E\) and \(F\). Greatest slope at \(D\). Least slope at \(F\).
-
current attempt in progress the position s of a car at time t is given …
(a) 1.5 ft/sec (b) 6.5 ft/sec (c) 4 ft/sec
-
the figure below shows n = f(t), the number of farms in the us¹ between…
(a) negative; decreasing (b) $f^{\prime}(1960)$ (c) negative; decreasing
-
let s = f(t) give an object’s height, in feet, above the ground t secon…
(a) $f(3)=100$ (b) $f^{\prime}(3)=14$
-
question 1. which of the following fields is an example of natural scie…
D. both physiological psychology & behavioral neuroscience
-
the karamazov ninjas by j. robbins the sound of ninja warriors doing ba…
A. Dmitri had tumbled backward into a giant potted plant. I sighed and shook my head. There wasn't enough money in the world to make babysitting the Karamazov ninjas worthwhile.
-
question 5 (2 points) in the context of the auditory system, ______ was…
Question 5: the volley principle Question 6: loudness
-
16. differentiate $g(x)=sqrt{x}ln(x - 3)$ answer: $g(x)=$
$\frac{\ln(x - 3)}{2\sqrt{x}}+\frac{\sqrt{x}}{x - 3}$