百度试题 结果1 题目What is the period of the tangent function? A. π/2 B. π C. 2π D. 3π 相关知识点: 试题来源: 解析 B。解析:The tangent function has a period of π.。反馈 收藏
$\tan \left( {{270}^{\circ }}+{{0}^{\circ }} \right)=\dfrac{-1}{0}$ , which is N.D. or undefined. Now, to check whether the value is $+\infty \text{ or }-\infty $ , we should use the graph of $y=\tan \left( x \right)\text{ at }x={{270}^{\c...
What is the biggest tangent of a prime?: With Matt Parker. Since the tangent function approaches infinity for odd multiples of pi/2 it should be no surprise that occasionally an integer is close to one of the multiples and has a very large tangent. But h
What is the arctangent of 1 ? arctan 1 = ? The arctangent is the inverse tangent function. Since tan π/4 = tan 45º = 1 The arctangent of 1 is equal to the inverse tangent function of 1, which is equal to π/4 radians or 45 degrees: arctan 1 = tan-1 1 = π/4 rad ...
A tangent line is a geometric relationship between a line and a curve so that the curve and the line share only one point in...
The arctangent is the inverse tangent function. Since tan 1.107 = tan 63.435º = 2 The arctangent of 2 is equal to the inverse tangent function of 2, which is equal to 1.107 radians or 63.435 degrees: arctan 2 = tan-12 = 1.107 rad = 63.435º...
Suds slopped over the rim of the washtub. Sloping The tangent of the angle of inclination of a line, or the slope of the tangent line for a curve or surface. Slopping To spill over; overflow. Sloping Offensive Slang Used as a disparaging term for a person of East Asian birth or ancest...
In order to solve this question, we will first start by considering $y=\arctan x$. It is the same as $y={{\tan }^{-1}}x$. Now let us move the inverse tangent to the left side of the equation. By doing so, it will give us, ...
Specifically, the cosine looks just like the sine, but shifted a bit to the left; the cosecant is a left-shift of the secant; the cotangent is the tangent after flipping it upside-down and then shifting the result a bit to the left. How did the trig ratios get their names? The trig...
The relation between two circles is that when they lie on the same plane they may intersect, circumscribe, separate, inscribe and include by following different conditions which we will be reading in the following article. The relationship between them f