Still early days with Mathematica so please forgive what is probably a very obvious question. I am trying to generate some parametric plots. I have:

```
ParametricPlot[{
(a + b) Cos[t] - h Cos[(a + b)/b t],
(a + b) Sin[t] - h Sin[(a + b)/b t]},
{t, 0, 2 \[Pi]}, PlotRange -> All] /. {a -> 2, b -> 1, h -> 1}
```

No joy: the replacement rules are not applied and `a`

, `b`

and `h`

remain undefined.

If I instead do:

```
Hold@ParametricPlot[{
(a + b) Cos[t] - h Cos[(a + b)/b t],
(a + b) Sin[t] - h Sin[(a + b)/b t]},
{t, 0, 2 \[Pi]}, PlotRange -> All] /. {a -> 2, b -> 1, h -> 1}
```

it looks like the rules ARE working, as confirmed by the output:

```
Hold[ParametricPlot[{(2 + 1) Cos[t] -
1 Cos[(2 + 1) t], (2 + 1) Sin[t] - 1 Sin[(2 + 1) t]}, {t, 0,
2 \[Pi]}, PlotRange -> All]]
```

Which is what I'd expect. Take the `Hold`

off, though, and the `ParametricPlot`

doesn't work. There's nothing wrong with the equations or the `ParametricPlot`

itself, though, because I tried setting values for a, b and h in a separate expression (`a=2; b=1; h=1`

) and I get my pretty double cardoid out as expected.

So, what am I doing wrong with `ReplaceAll`

and why are the transformation rules not working? This is another fundamentally important aspect of MMA that my OOP-ruined brain isn't understanding.

I tried reading up on `ReplaceAll`

and `ParametricPlot`

and the closest clue I found was that "`ParametricPlot`

has attribute `HoldAll`

and evaluates `f`

only after assigning specific numerical values to variables" which didn't help much or I wouldn't be here.

Thanks.