The targets are the values you want to predict. The ridge regression can in fact predict more values for each instance, not only one. The `coef_`

contain the coefficients for the prediction of each of the targets. It is also the same as if you trained a model to predict each of the targets separately.

Let's have a look at a simple example. I will use `LinearRegression`

instead of `Ridge`

, as `Ridge`

shrinks the values of the coefficients and make it harder to understand.

First, we create some random data:

```
X = np.random.uniform(size=100).reshape(50, 2)
y = np.dot(X, [[1, 2, 3], [3, 4, 5]])
```

The first three instances in `X`

are:

```
[[ 0.70335619 0.42612165]
[ 0.2959883 0.10571314]
[ 0.33868804 0.07351525]]
```

The targets `y`

for these instances are

```
[[ 1.98172114 3.11119897 4.24067681]
[ 0.61312771 1.01482915 1.41653058]
[ 0.55923378 0.97143708 1.38364037]]
```

Notice, that `y[0] = x[0]+3*x[1]`

, `y[1] = 2*x[0] + 4*x[1]`

and `y[2] = 3*x[0] + 5*x[1]`

(that's how we created the data with the matrix multiplication).

If we now fit the linear regression model

```
clf = linear_model.LinearRegression()
clf.fit(X, y)
```

the `coef_`

s are:

```
[[ 1. 3.]
[ 2. 4.]
[ 3. 5.]]
```

This exactly matches the equations we used to create the data.