1 - Packages

Let's first import all the packages that you will need during this assignment.

• numpy is the main package for scientific computing with Python.
• matplotlib is a library to plot graphs in Python.
• dnn_utils provides some necessary functions for this notebook.
• testCases provides some test cases to assess the correctness of your functions
• np.random.seed(1) is used to keep all the random function calls consistent. It will help us grade your work. Please don't change the seed.

2 - Outline of the Assignment

To build your neural network, you will be implementing several "helper functions". These helper functions will be used in the next assignment to build a two-layer neural network and an L-layer neural network. Each small helper function you will implement will have detailed instructions that will walk you through the necessary steps. Here is an outline of this assignment, you will:

• Initialize the parameters for a two-layer network and for an  L $L$-layer neural network.
• Implement the forward propagation module (shown in purple in the figure below).
  • Complete the LINEAR part of a layer's forward propagation step (resulting in  Z[l] $Z^{[l]}$).
  • We give you the ACTIVATION function (relu/sigmoid).
  • Combine the previous two steps into a new [LINEAR->ACTIVATION] forward function.
  • Stack the [LINEAR->RELU] forward function L-1 time (for layers 1 through L-1) and add a [LINEAR->SIGMOID] at the end (for the final layer  L $L$). This gives you a new L_model_forward function.
• Compute the loss.
• Implement the backward propagation module (denoted in red in the figure below).
  • Complete the LINEAR part of a layer's backward propagation step.
  • We give you the gradient of the ACTIVATE function (relu_backward/sigmoid_backward)
  • Combine the previous two steps into a new [LINEAR->ACTIVATION] backward function.
  • Stack [LINEAR->RELU] backward L-1 times and add [LINEAR->SIGMOID] backward in a new L_model_backward function
• Finally update the parameters.

Note that for every forward function, there is a corresponding backward function. That is why at every step of your forward module you will be storing some values in a cache. The cached values are useful for computing gradients. In the backpropagation module you will then use the cache to calculate the gradients. This assignment will show you exactly how to carry out each of these steps.

3 - Initialization

You will write two helper functions that will initialize the parameters for your model. The first function will be used to initialize parameters for a two layer model. The second one will generalize this initialization process to  L $L$ layers.

3.1 - 2-layer Neural Network

Exercise: Create and initialize the parameters of the 2-layer neural network.

Instructions:

• The model's structure is: LINEAR -> RELU -> LINEAR -> SIGMOID.
• Use random initialization for the weight matrices. Use np.random.randn(shape)*0.01 with the correct shape.
• Use zero initialization for the biases. Use np.zeros(shape).

Expected output:

3.2 - L-layer Neural Network

The initialization for a deeper L-layer neural network is more complicated because there are many more weight matrices and bias vectors. When completing the initialize_parameters_deep, you should make sure that your dimensions match between each layer. Recall that  n[l] $n^{[l]}$ is the number of units in layer  l $l$. Thus for example if the size of our input  X $X$ is  (12288,209) $(12288,209)$ (with  m=209 $m=209$ examples) then:

Remember that when we compute  WX+b $WX+b$ in python, it carries out broadcasting. For example, if:

Then  WX+b $WX+b$ will be:

Exercise: Implement initialization for an L-layer Neural Network.

Instructions:

• The model's structure is [LINEAR -> RELU]  × $\times$ (L-1) -> LINEAR -> SIGMOID. I.e., it has  L−1 $L-1$ layers using a ReLU activation function followed by an output layer with a sigmoid activation function.
• Use random initialization for the weight matrices. Use np.random.rand(shape) * 0.01.
• Use zeros initialization for the biases. Use np.zeros(shape).
• We will store  n[l] $n^{[l]}$, the number of units in different layers, in a variable layer_dims. For example, the layer_dims for the "Planar Data classification model" from last week would have been [2,4,1]: There were two inputs, one hidden layer with 4 hidden units, and an output layer with 1 output unit. Thus means W1's shape was (4,2), b1 was (4,1), W2 was (1,4) and b2 was (1,1). Now you will generalize this to  L $L$ layers!
• Here is the implementation for  L=1 $L=1$ (one layer neural network). It should inspire you to implement the general case (L-layer neural network).

    if L == 1:
        parameters["W" + str(L)] = np.random.randn(layer_dims[1], layer_dims[0]) * 0.01
        parameters["b" + str(L)] = np.zeros((layer_dims[1], 1))
  

Expected output:

4 - Forward propagation module

4.1 - Linear Forward

Now that you have initialized your parameters, you will do the forward propagation module. You will start by implementing some basic functions that you will use later when implementing the model. You will complete three functions in this order:

• LINEAR
• LINEAR -> ACTIVATION where ACTIVATION will be either ReLU or Sigmoid.
• [LINEAR -> RELU]  × $\times$ (L-1) -> LINEAR -> SIGMOID (whole model)

The linear forward module (vectorized over all the examples) computes the following equations:

where  A[0]=X $A^{[0]}=X$.

Exercise: Build the linear part of forward propagation.

Reminder: The mathematical representation of this unit is  Z[l]=W[l]A[l−1]+b[l] $Z^{[l]}=W^{[l]}{A}^{[l-1]}+b^{[l]}$. You may also find np.dot() useful. If your dimensions don't match, printing W.shape may help.

Expected output:

4.2 - Linear-Activation Forward

In this notebook, you will use two activation functions:

• Sigmoid:  σ(Z)=σ(WA+b)=11+e−(WA+b) $\sigma (Z)=\sigma (WA+b)=\frac{1}{1+e^{-(WA+b)}}$. We have provided you with the sigmoid function. This function returns two items: the activation value "a" and a "cache" that contains "Z" (it's what we will feed in to the corresponding backward function). To use it you could just call:

  A, activation_cache = sigmoid(Z)
  

• ReLU: The mathematical formula for ReLu is  A=RELU(Z)=max(0,Z) $A=RELU(Z)=max(0,Z)$. We have provided you with the relu function. This function returns two items: the activation value "A" and a "cache" that contains "Z" (it's what we will feed in to the corresponding backward function). To use it you could just call:

  A, activation_cache = relu(Z)
  

For more convenience, you are going to group two functions (Linear and Activation) into one function (LINEAR->ACTIVATION). Hence, you will implement a function that does the LINEAR forward step followed by an ACTIVATION forward step.

Exercise: Implement the forward propagation of the LINEAR->ACTIVATION layer. Mathematical relation is:  A[l]=g(Z[l])=g(W[l]A[l−1]+b[l]) $A^{[l]}=g(Z^{[l]})=g(W^{[l]}{A}^{[l-1]}+b^{[l]})$ where the activation "g" can be sigmoid() or relu(). Use linear_forward() and the correct activation function.

Expected output:

Note: In deep learning, the "[LINEAR->ACTIVATION]" computation is counted as a single layer in the neural network, not two layers.

Great! Now you have a full forward propagation that takes the input X and outputs a row vector  A[L] $A^{[L]}$ containing your predictions. It also records all intermediate values in "caches". Using  A[L] $A^{[L]}$, you can compute the cost of your predictions.

5 - Cost function

Now you will implement forward and backward propagation. You need to compute the cost, because you want to check if your model is actually learning.

Exercise: Compute the cross-entropy cost  J $J$, using the following formula:

Expected Output:

6 - Backward propagation module

Just like with forward propagation, you will implement helper functions for backpropagation. Remember that back propagation is used to calculate the gradient of the loss function with respect to the parameters.

Reminder:

Now, similar to forward propagation, you are going to build the backward propagation in three steps:

• LINEAR backward
• LINEAR -> ACTIVATION backward where ACTIVATION computes the derivative of either the ReLU or sigmoid activation
• [LINEAR -> RELU]  × $\times$ (L-1) -> LINEAR -> SIGMOID backward (whole model)

6.1 - Linear backward

For layer  l $l$, the linear part is:  Z[l]=W[l]A[l−1]+b[l] $Z^{[l]}=W^{[l]}{A}^{[l-1]}+b^{[l]}$ (followed by an activation).

Suppose you have already calculated the derivative  dZ[l]=∂∂Z[l] $d{Z}^{[l]}=\frac{\mathrm{\partial }\mathcal{L}}{\mathrm{\partial }{Z}^{[l]}}$. You want to get  (dW[l],db[l]dA[l−1]) $(d{W}^{[l]},d{b}^{[l]}d{A}^{[l-1]})$.

The three outputs  (dW[l],db[l],dA[l]) $(d{W}^{[l]},d{b}^{[l]},d{A}^{[l]})$ are computed using the input  dZ[l] $d{Z}^{[l]}$.Here are the formulas you need:

Exercise: Use the 3 formulas above to implement linear_backward().

Expected Output:

6.2 - Linear-Activation backward

Next, you will create a function that merges the two helper functions: linear_backward and the backward step for the activation linear_activation_backward.

To help you implement linear_activation_backward, we provided two backward functions:

• sigmoid_backward: Implements the backward propagation for SIGMOID unit. You can call it as follows:

dZ = sigmoid_backward(dA, activation_cache)

• relu_backward: Implements the backward propagation for RELU unit. You can call it as follows:

dZ = relu_backward(dA, activation_cache)

If  g(.) $g(.)$ is the activation function, sigmoid_backward and relu_backward compute

Exercise: Implement the backpropagation for the LINEAR->ACTIVATION layer.

Expected output with sigmoid:

Expected output with relu

6.3 - L-Model Backward

Now you will implement the backward function for the whole network. Recall that when you implemented the L_model_forward function, at each iteration, you stored a cache which contains (X,W,b, and z). In the back propagation module, you will use those variables to compute the gradients. Therefore, in the L_model_backward function, you will iterate through all the hidden layers backward, starting from layer  L $L$. On each step, you will use the cached values for layer  l $l$ to backpropagate through layer  l $l$. Figure 5 below shows the backward pass.

Initializing backpropagation: To backpropagate through this network, we know that the output is,  A[L]=σ(Z[L]) $A^{[L]}=\sigma (Z^{[L]})$. Your code thus needs to compute dAL  =∂∂A[L] $=\frac{\mathrm{\partial }\mathcal{L}}{\mathrm{\partial }{A}^{[L]}}$. To do so, use this formula (derived using calculus which you don't need in-depth knowledge of):

dAL = - (np.divide(Y, AL) - np.divide(1 - Y, 1 - AL)) # derivative of cost with respect to AL

You can then use this post-activation gradient dAL to keep going backward. As seen in Figure 5, you can now feed in dAL into the LINEAR->SIGMOID backward function you implemented (which will use the cached values stored by the L_model_forward function). After that, you will have to use a for loop to iterate through all the other layers using the LINEAR->RELU backward function. You should store each dA, dW, and db in the grads dictionary. To do so, use this formula :

For example, for  l=3 $l=3$ this would store  dW[l] $d{W}^{[l]}$ in grads["dW3"].

Exercise: Implement backpropagation for the [LINEAR->RELU]  × $\times$ (L-1) -> LINEAR -> SIGMOID model.

Expected Output

6.4 - Update Parameters

In this section you will update the parameters of the model, using gradient descent:

where  α $\alpha$ is the learning rate. After computing the updated parameters, store them in the parameters dictionary.

Exercise: Implement update_parameters() to update your parameters using gradient descent.

Instructions: Update parameters using gradient descent on every  W[l] $W^{[l]}$ and  b[l] $b^{[l]}$ for  l=1,2,...,L $l=1,2,...,L$.

Expected Output:

7 - Conclusion

Congrats on implementing all the functions required for building a deep neural network!

We know it was a long assignment but going forward it will only get better. The next part of the assignment is easier.

In the next assignment you will put all these together to build two models:

• A two-layer neural network
• An L-layer neural network

You will in fact use these models to classify cat vs non-cat images!