PLEASE HELP

I have some homework problems but I was playing clash royale in class today and I wasn’t paying attention to lecture so I have no idea how to do my homework :(

Its only 10 problems but idk anything

1) Solve for x, 4x + 3 = 7

2) Solve for x, 2x = 8

3) Solve for x, 3x - 1 = 8

4) Solve for x, 7x / 7 = 1

5) Solve for x, 5x + 3 = 23

6) Solve for x, 8x - 8 = 1

7) Given div(F)=0, it is true that curl(G)=F for a vector field G, iff F and G are C1 on all of R^3.

Let F(x,y,z)=(ax,by,cz) where a,b,c are constants in R. Then using the above theorem, we can say if div(F)= a+b+c=0, then F = curl(G) for a vector field G. Use ONLY the properties of curl, and not the concept of divergence, to show that if a+b+c=0, then F = curl(G) for a vector field G. Then, for generic choices of a,b,c with a+b+c=0, find a possible G.

8) Solve for x, 8x - 4 = 0

9) Solve for x, 3x + 3 = 15

10) Solve for x, 6x + 9 = 33

Please help!!! I will do anything if you can help me finish homework 🙏🙏🙏🙏

https://www.symbolab.com thank me later

x is the friends we made along the way

baiters have evolved

C'mon frozenblueberries I thought you were better than this.. can't believe that you can't even solve Given div(F)=0, it is true that curl(G)=F for a vector field G, iff F and G are C1 on all of R^3.

Let F(x,y,z)=(ax,by,cz) where a,b,c are constants in R. Then using the above theorem, we can say if div(F)= a+b+c=0, then F = curl(G) for a vector field G. Use ONLY the properties of curl, and not the concept of divergence, to show that if a+b+c=0, then F = curl(G) for a vector field G. Then, for generic choices of a,b,c with a+b+c=0, find a possible G.

Nice bait kid
Puts some 6th class algebra and then quietly slides in a vector calculus problem

Ask elon musk

Man sneaked in vector calc problem with some 6th class equations

1) x=1

2) x=4

3) x=3

4) x=1

5) x=4

6) x=0.88...

7) idfk

8) x=0.5

9) x=4

10) x=4