I think this whole thing about a complex oriented generalised cohomology theory is really just abstracting the notion of Thom class you find in (co)homology. More specifically, a complex oriented generalised cohomology theory $\mathcal{E}$ is a multiplicative cohomology theory (i.e a cohomology theory (but might differ from the singular case if you're not requiring the dimension axiom) with products) where you have a notion of Thom class (for complex vector bundles)

i.e. For every complex bundle $E\rightarrow B$, there is an element $\mathcal{E}^{2n}(E,E-0)$ which when restricted to fibre …

And I think the upshot is that the definitions and arguments you see when talking about Thom classes. For example you have Thom isomorphism and your Gysin maps, i.e. in the singular case when you have a submanifold $Z$ of codimension $c$ in $M$ (with appropriate orientations etc. - for the source I'm reading everything are complex manifolds) , you have maps $H^{i-2c}(Z) \rightarrow H^i(M)$ obtained by Excision and tubular neighbourhoods etc.,

which allows you to define the fundamental class of $Z$ to be the image of $1$ under $H^0(Z) \rightarrow H^{2c}(M)$ (which is poincare dual to the fu…

@BalarkaSen
I don't know a lot about spectra (i.e. I basically only know their definition) - but I think in general a multiplicative cohomology theory is represented by a ring spectrum - and a complex oriented generalized cohomology theory is represented by a (commutative, associative) ring structum equipped with a complex orientation for the tautological bundle over $\mathbb{C} \mathbb{P}^{\infty}$ (in the sense as above, basically)

I'm not sure if there's more to say about this in the general context.. but specifically for $K$-theory because of Bott periodicity, the corresponding spectra…