uric acid calculusa hard, yellow or reddish-yellowurinary calculusformed fromuric acid. urinary calculusa calculus in any part of theurinarytract; it isvesicalwhen lodged in the bladder andrenal(seekidney stone) when in therenalpelvis. Common types named for their primary components areoxalate c...
n. a hard lump produced by the concretion of mineral salts; found in hollow organs or ducts of the body n. the branch of mathematics that is concerned with limits and with the differentiation and integration of functions calculus的用法和例句: ...
So that's the calculus part.(在这时这个问题中微积分的部分。) Maria Droujkova is a founder of Natural Math, and has taught basic calculus concepts to 5-year-olds.(玛丽亚·德鲁伊科娃是“自然数学”的创始人之一,她曾向5岁的儿童教授基础微积分概念。) But, calculus, really, is about studyin...
1. the branch of mathematics that is concerned with limits and with the differentiation and integration of functions Synonym: infinitesimal calculus 2. a hard lump produced by the concretion of mineral salts found in hollow organs or ducts of the body ...
1. a hard lump produced by the concretion of mineral salts; found in hollow organs or ducts of the body; "renalcalculican be very painful" 2. an incrustation that forms on the teeth and gums 3. the branch of mathematics that is concerned with limits and with the differentiation and inte...
For $x < 0$ and small use that $\sin(-x) = -\sin x$ so that $${\sin(-x) \over -x} = {\sin x \over x}.$$ As far as why the first inequality I said is true, you can do this completely from triangles but I don't know how to draw the pictures here. Share ...
Calculus is a branch of mathematics that works with the paths of objects in motion. There are two divisions of calculus; integral...
A premature focus on rigor dissuades students and makes math hard to learn. Case in point: e is technically defined by a limit, but theintuition of growthis how it was discovered. The natural log can be seen as an integral, or thetime needed to grow. Which explanations help beginners mor...
so, let's consider the power series f(x)=∑n=0∞n2xn.f(x)=∑n=0∞n2xn. If we can find a simpler expression for the function f(x)f(x), and if 1212 lies within its interval of convergence, then your series is exactly f(12)f(12). Now, we note that f(x)=0 n=0+...
The goal here, as the name suggests, is to really get to the heart of the subject out in one binge-watchable set. But with a topic that’s as broad as calculus, there’s a lot of things that can mean, so here’s what I have in mind specifically: ...