234+356
= 590
What's your question?
100,000,000,000 x 200,000,000,000,000,000
= 1E11 x 2E17
= (1x2)E(11+17)
= 2E28
= 20,000,000,000,000,000,000,000,000,000
slice them in half means nothing in the equation.
You will have:
2+10 cookies
which is 12 cookies.
Note: Reason why slicing them in half means nothing.....
Let n be one piece of cookie.
You will get two halves of cookie by slicing them in half
which is 2 times n/2
which is n
\({a}^{-n} = \frac{1}{a^n}\)
For any angle m over 360 degrees......
The corresponding angle = m - 360n
where 360n is the biggest possible multiple of 360 that can be subtracted from m.
[22-(8*2)of(-9)/3+(10-6)*2
I suppose the of is a multiplication.
[22-(8*2)*(-9)/3+(10-6)*2]
Note that the [ and ] means nothing.
= 22-(8*2)*(-9)/3+(10-6)*2
= 22-(8*2)*(-9)/3+4*2 Brackets.
= 22-(-48)+8 Multiplication and Division
= 22 + 48 + 8 Brackets. Again
= 78 Addition
the Cubic Formula is kept as a secret by the mathematicians in 1600s so we never know how to obtain solutions of cubic equations other than factorization or until some people get the Cubic formula eventually (?) and shares to all people.....
That will be one more chapter in maths book...... . LOL.
Linear :
Always in the form ax + b = c
Therefore the general solution of x is \(\frac{c-b}{a}\)
Quadratic:
ax^2 + bx + c = 0
Let there are 2 numbers p and q where b is always p+q and c is always pq.
(There is always 2 numbers which satisfies these conditions )
(ax+p)(x+q) = 0
general solution of x : x = -p/a or x = -q
The exponential function e^z can be defined as the limit of (1 + z/N)N, as Napproaches infinity, and thus eiπ is the limit of (1 +iπ/N)N. The computation of (1 + iπ/N)N is displayed as the combined effect of N repeated multiplications in the complex plane, with the final point being the actual value of (1 +iπ/N)N. It can be seen that as N gets larger (1 +iπ/N)Napproaches a limit of −1.
Source: Wikipedia.
I think that means the y axis represents complex numbers i , 2i , 3i ...... and x axis represents real numbers 1, 2, 3 .....
. LOL.