A But I tend to use P Q R for sentences and A for A, now that I have explained it, that should be smaller case.
但是我喜欢用P,Q,R来代表句子,A就代表,我已经解释了,应该是小写的。
Q comes between P and R in the English alphabet.
英语字母表中,Q在P和R之间。
You pick two huge prime numbers "p" and "q."
首先 选择两个很大的质数“p”和“q”,并对他们求积得到“n=p*q”。
So, unlike the other two methods of inference Q you can't take P implies q , Q not P therefore not Q but , these two are both above approach.
不同与上两个推论方法,不能把P等同于,也不是P,那是无效的,并不能说P暗指Q,,q,therefore,P,that’s,invalid,and,it’s,invalid,to,say,p,implies,q,,没有P因此没有Q,这两种情况都是不同的。
Not P therefore Q. do you remember that argument?
非P所以Q你们记得那个论点吗?
If we got an if then statement are we asserting an antecedent, an if clause or the consequent, Q the then clause, or are we saying if P then Q.
如果我们的论述中有如果,我们在主张先行词,假设条件句或者结果,然后从句,或者我们说如果P那么。
Q Here is a valid argument form. If P then Q. P therefore Q.
这里有一个有效的论点形式,如果P,那么Q,P所以。
Q But If you have P or Q, you see the or is rather different isn't it logically?
但是如果你有P或者,你看到或者就很不同了,逻辑上不是吗?
As you see. So P is: I am hungry. Q is: I can't concentrate.
正像你看到的,P是我饿了,Q是我无法集中精力。
Q can you see how that all cancels each other out? P unless Q.
你们明白这些怎样互相抵消吗?,P除非。
I'd ask you which one you wanted Q but I want you to choose one. You can choose either P or Q.
你们喜欢那些,但是我想让你们选一个,你可以选p或者。
And for that to possibly happen, well, we need certainly some relations between p, Q and r.
要使得这个成立,当然需要一些p,Q,R之间的关系。
Q This is a disjunctive syllogism. P or Q, not P therefore Q.
这个是析取三段论,P或者Q,不是P所以。
If P is false what is the truth value of P and Q.
如果P为假,P和Q真理的重要性是什么?
So, if Q is false P can't be true.
如果Q是假的,P也不会是真的。
How can P and Q be true if Q isn't true.
如果Q不为真,P和Q怎么可能为真。
Q and your just twisted is an insult added on. P unless Q.
你就扭了,加上了人身攻击,P除非。
Because necessary condition for P and Q being true if P and Q are true. Sorry. It is. You all knew that immediately.
因为P和Q为真的必要条件,如果P和Q为真,不是,你们立刻知道了。
What we are saying here is if Q is necessary for P so if Q isn't the case then P isn't the case either.
我们说的,如果Q对于P来说是必须的,所以如果Q不是这样,P也不是这样。
So I can represent it in one line and put P and Q on the same line.
我可以用一句话代表,把P和Q放在同一句话里。
That is clearly a valid method that the inference, if P does implies Q that just means If P is true then Q is true too.
这是证明推论的有效方法,如果P暗指Q,那么Q是真的,P也会是真的。
Ok, if I say something is P and Q then I say is that true?
好,如果我说P和Q,那么我说那为真?
Now if I look at P and Q I can say this is true, this whole sentence is true isn't it?
如果我看p和Q,我说都为真,整个句子就为真,不是吗?
I haven't gotten use to truth table but it doesn't really matter Q because they are very easy. True true false false, P and Q.
我没有用真理表格,但是这无所谓,因为很简单,真真假假,P和。
Q And we are looking for an if P then Q.
我们看的是如果P,那么。
You then make "n" and "e" public and keep "d" as secret as you possibly can and then throw away "p" and "q" (or keep them as secret as "d").
然后将“n”和“e”公开出去,而对“d”要保密,对于“p”和“q”你可以把它们扔掉,也可以像“d”一样保密起来。
If you will forgive me for a second, Q I will still use P and Q for now.
请再次原谅我,我还是会用P和。
Multiply them to get "n = p*q." Next, you pick a small public exponent "e" which is the "encryption exponent" and a specially crafted inverse of "e" called "d" as the "decryption exponent."
接下来,取一个较小的“e”作为指数,它用作“加密指数”,而对e的进行特殊的逆反函数计算所得到的“d”作为“解密指数”。
Let's say that my vector field has components p, Q and r.
假定我的向量场。
Let's call it q. P is the point that coordinates x, y, h.
就叫它q,p的坐标是。
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