# How do you draw a line using the weight vector in a Linear Perceptron? [closed]

I understand the following:

In 2D space, each data point has 2 features: x and y. The weight vector in 2D space contains 3 values [bias, w0, w1] which can be rewritten as [w0,w1,w2]. Each datapoint needs an artificial coordinate [1, x, y] for the purposes of calculating the dot product between it and the weights vector.

The learning rule used to update the weights vector for each misclassfied point is w := w + yn * xn

My question is: how do you derive two points from the weight vector w = [A, B, C] in order to graph the decision boundary?

I understand A + Bx + Cy = 0 is the linear equation in general form (A, B, C are can be taken from the weights vector) but I don't know how to plot it.

Plug your weights into the general form (w0 + w1x + w2y = 0) and solve for x, x=0, y, y=0:

``````x = -(w0 - w2y)/w1
x = 0 when y = -w0/w2
y = -(w0 - w1x)/w2
y = 0 when x = -w0/w1
``````

Now we have two points that lie on the line: (0, -w0/w2) and (-w0/w1, 0)

``````slope = -(w0/w2)/(w0/w1)
intercept = -w0/w2
``````
• This exactly worked for me. I was designing a simple perceptron with two inputs and one input for bias, so after training i have got 3 weights, w0, w1, w2, and w0 is nothing but the bias. I plug in the values in the slope, intercept formula above, and it nicely drawn the decision boundary for my sample data points. Thanks. Dec 29, 2017 at 12:25
• Could you simplify the slope further to -w1/w2? Nov 19 at 20:34

Recently I was trying to implement the same thing, but too confused how to draw the decision boundary plot with three weights \$w_0,w_1,w_2\$. And based on @Joshu solution mentioned above, I have written matplotlib code to draw boundary line.

``````def plot_data(self,inputs,targets,weights):
# fig config
plt.figure(figsize=(10,6))
plt.grid(True)

#plot input samples(2D data points) and i have two classes.
#one is +1 and second one is -1, so it red color for +1 and blue color for -1
for input,target in zip(inputs,targets):
plt.plot(input[0],input[1],'ro' if (target == 1.0) else 'bo')

# Here i am calculating slope and intercept with given three weights
for i in np.linspace(np.amin(inputs[:,:1]),np.amax(inputs[:,:1])):
slope = -(weights[0]/weights[2])/(weights[0]/weights[1])
intercept = -weights[0]/weights[2]

#y =mx+c, m is slope and c is intercept
y = (slope*i) + intercept
plt.plot(i, y,'ko')
``````

The best way to draw a line is to find the minimum x value and maximum x value on your display axis. calculate y values using the known line equation (-(A+BX)/C). This result in two points use inbuilt plot command to draw a line.