I'm using a set of points which go from `(-5,5)`

to `(0,0)`

and `(5,5)`

in a "symmetric V-shape". I'm fitting a model with `lm()`

and the `bs()`

function to fit a "V-shape" spline:

```
lm(formula = y ~ bs(x, degree = 1, knots = c(0)))
```

I get the "V-shape" when I predict outcomes by `predict()`

and draw the prediction line. But when I look at the model estimates `coef()`

, I see estimates that I don't expect.

```
Coefficients:
Estimate Std. Error t value Pr(>|t|)
(Intercept) 4.93821 0.16117 30.639 1.40e-09 ***
bs(x, degree = 1, knots = c(0))1 -5.12079 0.24026 -21.313 2.47e-08 ***
bs(x, degree = 1, knots = c(0))2 -0.05545 0.21701 -0.256 0.805
```

I would expect a `-1`

coefficient for the first part and a `+1`

coefficient for the second part. Must I interpret the estimates in a different way?

If I fill the knot in the `lm()`

function manually than I get these coefficients:

```
Coefficients:
Estimate Std. Error t value Pr(>|t|)
(Intercept) -0.18258 0.13558 -1.347 0.215
x -1.02416 0.04805 -21.313 2.47e-08 ***
z 2.03723 0.08575 23.759 1.05e-08 ***
```

That's more like it. Z's (point of knot) relative change to x is ~ +1

I want to understand how to interpret the `bs()`

result. I've checked, the manual and `bs`

model prediction values are exact the same.