Help to modify five English sentences. See if there are grammar, words and so on I konw a wonderful Chinese teacher. You can call her Miss Zhang . She is tall and like dress with casnal clothes. Her character are enthusicasm honest and funny. You can visit her in afternoon on weekend.
Like → likes, dress → dressing, with, caspal → casual, are → is, enthusiasm → enthusiastic
What's wrong with the grammar of this English sentence
xxx,So why do students like cheating in exams even if they could be caught by teachers?
Change them could be taught to be taught
Even if leads to a concession adverbial clause, which uses the simple present tense
Is 1g / cm & # 179; = 10 & # 179; kg / M & # 179; reversed
Is that the opposite? How do I feel the opposite
Yes, I was very impressed when I was a student. I didn't think it was wrong. 1kg = 103G, 1m3 = 103cm3, you can calculate it
PI decimal point 200 digits
To 1000, it should satisfy you. Ha ha.. 3.1415926535 8979323846 2643383279 5028841971 6939937510 5820974944 5923078164 0628620899 8628034825 3421170679 8214808651 3282306647 0938446095 5058223172 535940812
Find ∫ ∫ (d) 1 / (1 + X + y + Z) ^ 3, where D is the tetrahedron formed by the plane x + y + Z = 1 and three left sides
∫ (0 ~ 1) DX ∫ (0 ~ 1-x) dy ∫ (0 ~ 1-x-y) 1 / (1 + X + y + Z) ^ 3dz, and then how to solve it next
Step by step integral can be ∫ (0 ~ 1-x-y) 1 / (1 + X + y + Z) ^ 3dz = [- 1 / 2 (1 + X + y + Z) ^ 2] (0 ~ 1-x-y) = 1 / 2 (1 + X + y) ^ 2 - 1 / 8 ∫ (1 / 2 (1 + X + y) ^ 2 - 1 / 8) dy = 1 / 2 (1 + x) - (3-x) / 8 integral limit (0,1-x) ∫ (1 / 2 (1 + x) - (3-x) / 8) DX = ln (1 + x)
Factorization of the square of a-4c + the square of b-2ab
The answers are as follows:
a² + b ² - 2ab - 4c²
=(a - b)² - 4c²
=(a - b + 2c)(a - b - 2c)
8.6 can be a. divisible by 2 b. divisible by 2 C. divisible by 2
C is divided by 2
P is the point on the square / 4 of X + the square / 3 of y = 1 of the ellipse with focus F1 and F2, then the difference between the maximum and minimum value of Ⅰ Pf1 Ⅰ * Ⅰ PF2 Ⅰ is 0
It's novel! 0
|PF1|+|PF2|=2a=4;
0
The product of 17 and what number is still prime
The product of 17 and 1 is still prime
Is the function y = f (x) periodic if the function image is symmetric with respect to m (a, 0) and n (B, 0)
It must be a periodic function
For any point (A-X, f (A-X))
Because the function is symmetric with respect to (a, 0),
So the image must pass (a + X, - f (A-X))
And because the function image is symmetric with respect to (B, 0)
So the image must pass (2b-a-x, f (A-X))
So t = 2b-2a must be a period of the function