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- As the width and the depth are increasing, so is the area of the rectangle. But the increase of the area cannot be ex *increasing slopes = tangents rotate counter-clockwise.82 KB (14,116 words) - 19:50, 6 December 2018
- '''Exercise.''' Prove that if the density of the rod is strictly increasing (or decreasing), its center of mass cannot be in the center. '''Exercise.''' Find the center of mass of a rod with a linearly increasing density.103 KB (18,460 words) - 01:01, 13 February 2019
- *Sketch the graph of a function f that has the following property: f is increasing and concave down on $[-1,1]$. *$f′(x)=(e^{x})².$ (a) On what intervals, if any, if f increasing? (b) On which intervals, if any, is f concave down? (c) Sketch the grap3 KB (435 words) - 19:23, 13 June 2011
- '''Proof.''' First, the sequence of partial sums of this series is ''increasing'': ...partial sums of a series $\sum a_n$ with non-negative terms, $a_n>0$, is ''increasing'':113 KB (19,100 words) - 23:07, 3 January 2019
- ...creasing or decreasing; (b) $b_n\to +\infty$ as $n\to \infty$ but it's not increasing.1 KB (246 words) - 19:10, 31 October 2018
- ...usly increases or decreases in both locations. Such a function can only be increasing or decreasing, i.e., monotonic. ...es are computed and displayed on the right. The scores for $A, ..., J$ are increasing in the obvious way: from $0$ to $.1$. In particular, $F$ is $\#$5.47 KB (8,030 words) - 18:48, 30 November 2015
- '''Theorem (Monotonicity).''' A $0$-chain map is increasing (decreasing) on an interval if and only if its exterior derivative is posit '''Theorem (Monotonicity).''' A $0$-chain map is increasing (decreasing) on an interval if and only if its derivative is positive (nega41 KB (7,344 words) - 12:52, 25 July 2016
- ...it is sufficient to know the sign of the derivative to distinguish between increasing and decreasing behavior. Therefore, this behavior depends only on the topol ...g, the sign of the exterior derivative will tell us the difference between increasing and decreasing behavior. But the derivative only uses the topological prope42 KB (7,131 words) - 17:31, 30 November 2015
- ...variable. This is how the concavity with respect to $x$ is increasing with increasing $y$:97 KB (17,654 words) - 13:59, 24 November 2018
- ...it is sufficient to know the sign of the derivative to distinguish between increasing and decreasing behavior. Therefore, this behavior depends only on the topol ...g, the sign of the exterior derivative will tell us the difference between increasing and decreasing behavior. But the derivative only uses the topological prope41 KB (6,928 words) - 17:31, 26 October 2015
- But does the latter approximate the former? Will increasing the “resolution” of the discretization allow us to recover the original ...his problem the same way one would deal with other accuracy problems -- by increasing the resolution of the image. In fact, a curve can be approximated by a digi21 KB (3,664 words) - 02:02, 18 July 2018
- ...n the curve is oriented, i.e., its direction is indicated, and $t=g(s)$ is increasing. Now assuming that $s$ is increasing with respect to $t$ (same direction!), we have a convenient way to describe130 KB (22,842 words) - 13:52, 24 November 2018
- **3.1 Increasing and Decreasing Functions **3.1 Increasing and Decreasing Functions9 KB (1,141 words) - 16:08, 26 April 2015
- ...ncreasing at a rate of 5 cm²/sec. At what rate is the radius of the circle increasing when the area is 2 cm?991 bytes (164 words) - 20:21, 13 June 2011
- *Prove, from the definition, that the function $f(x)=x^2+1$ is increasing for $x>0$. ...n below. Describe its behavior the function using words “decreasing” and “increasing”.17 KB (2,933 words) - 19:37, 30 July 2018
- ...t a rate of 5 cm<sup>2</sup>/sec. At what rate is the radius of the circle increasing when the area is 2cm?3 KB (458 words) - 04:13, 21 May 2011
- ...reas by filling them with increasing number of rectangles or triangles and increasing the number of sides with each step. We can then calculate the area by calcu4 KB (703 words) - 14:34, 9 September 2016
- ...reasing at a rate of $5$ cm²/sec. At what rate is the radius of the circle increasing when the area is $2$ cm?976 bytes (164 words) - 20:22, 13 June 2011
- This can't be a circle as its radius would have to be increasing. We can observe the non-uniformity of propagation for the shamshir:14 KB (2,504 words) - 14:59, 17 September 2019
- Project statements are below in the order of increasing complexity. ''All'' submissions are linked even the failed ones.13 KB (2,078 words) - 22:43, 26 October 2019
