<p>Integrate the f'(x) function</p>
<p>You get some thing like f(x) = _____ + c</p>
<p>we're given f(0) = 1, plug in 1 for f(x) and 0 for each "x" in the problem.</p>
<p>Once you find c, we have the entire equations, therefore, just plug in 2 and you're good to go.</p>
<p>As far as I can tell, that problem is unsolvable by AB/BC standards. :</p>
<p>i can't integrate that though.</p>
<p>it was on the AB practice test released by CollegeBoard.</p>
<p>anyone have any random informative websites, or practice tests on them. The practice tests dont have to be college board, they can be anything. I need to review some stuff and practice more and I would really appreciate it if you could post some stuff. Otherwise, you can just PM me or send it to <a href="mailto:sixthsense24@yahoo.com">sixthsense24@yahoo.com</a>.</p>
<p>Thanks!</p>
<p>@jasonlee576:</p>
<p>What problem number is it?</p>
<p>that's definitely a clac. question im guessing...</p>
<p>How do you get Y naught on the calculator?</p>
<p>Y-naught can be found in the calculator under "VARS". If you arrow right to Y-VARS, and select "Function...", it's on that list of variables, I believe.</p>
<p>In general, if you're given a function g' and a value g(c), where c is a constant, then if k is another constant, g(k) = g(c) + integral(c,k) g'(t) dt.</p>
<p>And yes, these kinds of questions tend to be calculator active.</p>
<p>What are youir predictions on what's coming on frq this year?</p>
<p>More or less the same stuff that's seen every year? :D</p>
<p>lol which is ...</p>
<p>Volume of revolution problem, something involving a table / Riemann sums, uh... that's a good question actually >_></p>
<p>I'm just hoping there isn't something as abstract as 2004 form B #6... that one really stumped me. :(</p>
<p>I'd guess there's:</p>
<p>an area / volumes of solids of revolution question.</p>
<p>some position / velocity / acceleration question.</p>
<p>some integral as accumulation question.</p>
<p>some fundamental theorem of calculus question</p>
<p>probably a table / Riemann sum question</p>
<p>and recently, they've done a lot of separable differential equations / slope fields questions (even though they didn't last year on the free response).</p>
<p>Yea Hippo. We went over that one in class today.... I got the all the parts eventually, but it took me like 30+ mins. That one was absurdly hard</p>
<p>man that's a pretty good study guide thanx</p>
<p>based on what you guys are predicting the format should be similar to the 2003 exam right?</p>
<p>If f'(x) = sin ((pi* e^x)/2) and f(0) = 1, then f(2) =
how would you solve this?? I can't integrate it using my calculator</p>
<p>You can't solve it by hand, at least using the techniques in AP calculus.</p>
<p>I NEED HELP...
Can someon help me solve these:</p>
<p>A curve has slope 2x+3 at each point (x,y) on the curve. Which of the following is an equation for this curve if it apsses through the point (1,2)?
Correct answer is: y= x^2 + 3x -2</p>
<p>Also:
A differential function f has the property that f(5) =3 and f '(5)=4. What is the estimate for f (4.8) using the local linear approximation for f at x=5?</p>
<p>THANK U</p>