Divisor scalar multiplication is the key operation in hyperelliptic curve cryptosystem.
除子标量乘是超椭圆曲线密码的关键运算。
According to the theory of scalar diffraction, first, the equipollence of spatial distribution of the plane-wave interferential field and parallel projective sine grating is discussed.
摘要根据标量射理论,首先讨论了两平面场的空间分布与平行投影正弦光栅的等价性。
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It turns out that scalars also share this coordinate invariance property.
事实证明,标量也具有这种坐标不变性。
We know how to multiply by a scalar.
我们知道如何乘以一个标量。
When you multiply it by a scalar, or you're not changing its direction.
当你把乘以一个标量,或者你没有改变向时。
And now let's begin the unit 1 review in earnest with vectors and scalars.
现在让我们从向量和标量开始认真复习第一单元。
And Bobby, please give me some examples of scalars in physics.
鲍比, 请给我举一些物理学中标量子。
Like if, you know, let's go back to our kind of second grade world of just scalars.
就像,你知道,让我们回到我们那种只有标量二年级世界。
The scalar scaled up the vector. That might make sense.
标量放大矢量, 这也许是有道理。
Remember how I said that linear algebra revolves around vector edition and scalar multiplication?
还记得我说过线性绕着向量编辑和标量乘法吗?
Or it might make an intuition of where that word scalar came from.
或者可能会直觉地知道" 标量" 这个词来自哪里。
The only variable which is the same in both directions is change in time because change in time is a scalar.
唯一在两个向上相同变量是时间变化,因为时间变化是一个标量。
The scalar, when you multiply it, it scales up a vector.
标量, 当你乘以时, 会放大一个向量。
This is considered to be a scalar quantity.
这被认为是一个标量量。
The way you'll often hear this described is that linear transformations preserve the operations of vector edition and scalar multiplication.
您经常听到描述是 线性变换保留了向量编辑和标量乘法操作。
When we multiply it times some scalar factor.
当我们将乘以某个标量因子时。
You often think of this as being broken up into a real or " scalar" part, and then a 3d imaginary part.
您通常认为被分解为实部或“标量” 部分,然后是 3d 虚部。
Examples of scalars are time, distance, mass, speed, volume, density, work, energy, rotational inertia, and that's all I can think of.
标量子有时间、距离、质量、速度、体积、密度、功、能量、转动惯量,这些就是我能想到。
Or even better, what vector, if I take any arbitrary scalar-- can represent any other vector on that line?
或者更好是,如果我采用任何任意标量,那么哪个向量可以表示该行上任何其他向量?
The distance between you and a bench, and the volume and temperature of the beverage in your cup are all described by scalars.
你和长凳之间距离,以及你杯子里饮料体积和温度,都是用标量来描述。
So what happens if we take t, so some scalar, times our vector, times the vectors b minus a?
那么,如果我们取 t, 即一些标量, 乘以我们向量,乘以向量 b 减去 a, 会发生什么呢?
But we just did it the first way the last time because I wanted to go from my basic definitions of scalar multiplication.
但是我们上次只是用第一种法来做,因为我想从我对标量乘法基本定义开始。
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详细解释
的关键运算。
学之美 
射理论,首先讨论了两平面
场的空间分布与平行投影正弦光栅的等价性。
乘以一个
向时。
子。
绕着向量编辑和
描述是 线性变换保留了向量编辑和
