Not entirely certain I know what you want, but this may be a start.

[Edit: I changed pi (just a symbol) to Pi (the circle constant thing)]

At the beginning I define i to be sqrt(-1) as you want and D to be a regular variable rather than the differential operator.

Maple gives the answer as a sum over roots of a quartic polynomial. To get a simpler formula, you will need to give values to some variables or parhaps tell Maple their signs (using assuming)

Download Linear_System.mw

As well as Joe's corrections, you need to assign to y (y:=1). 
 

Download ww.mw

I suspect you want gcdex(x^9-a, b*x^6-c, x); but the answer is 1. You may need to specify the numerical value of more of the coefficients.

Try

T := unapply('fsolve'(m(t, c) = -1, t = 0 .. (1/2)*Pi), c, numeric);

In general use unapply to make functions from expressions earlier in the worksheet. The numeric option means that plot and other functions evaluated with a symbolic value will not throw an error.

So the constant _C3 means another condition is required. Presumably you want the solution to drop off at y=infinity.

pdetest suggests your solution does not solve the pde.
 

Download pde.mw

Use := to assign the right-hand side to the left. Some other issues also:

Download vectors.mw

Try entering in 1D Maple input, e.g. at a > prompt use ctrl-M then `≤`

You will see that `≤` is rendered as less-than-or-equals, as it would be in HTML.

Changes in red.
 

Download proc.mw

There is a missing *. The differentiation works in Maple 2017.
 

Download Diff.mw

Download rod.mw

Like this?

Download orthogonal.mw

I did G11; the others are similar

Transfer_function.mw

In the File Menu under Document Properties, you should have an attribute named Active which is false for a regular help page and true for an active worksheet.

in 1D input:

ode:=diff(y(x),x,x)=2*y(x)+1;
dsolve(ode);
 

does work, so this is probably incorrect entry of the derivative in 2-D math. [Edit: actually the error message confirms this.] Use the right-click menu 2-D math/convert to 1D math input and see if it looks like the above. If not, use 1-D input (ctrl-M) before the input, or use the expression palette for the derivative and use "^" to raise the powers of 2.

I don't understand exactly what you mean - if you want real-only frequency domain, you need the time domain array to have the real part  symmetric about the centre and the imaginary part antisymmetric about the centre.

Edit: And here is a complex example that works pretty much as I would expect:

Download fid.mw