%% Machine Learning Online Class - Exercise 2: Logistic Regression % % Instructions % ------------ % % This file contains code that helps you get started on the logistic % regression exercise. You will need to complete the following functions % in this exericse: % % sigmoid.m % costFunction.m % predict.m % costFunctionReg.m % % For this exercise, you will not need to change any code in this file, % or any other files other than those mentioned above. % %% Initialization clear ; close all; clc %% Load Data % The first two columns contains the exam scores and the third column % contains the label. data = load('ex2data1.txt'); X = data(:, [1, 2]); y = data(:, 3); %% ==================== Part 1: Plotting ==================== % We start the exercise by first plotting the data to understand the % the problem we are working with. fprintf(['Plotting data with + indicating (y = 1) examples and o ' ... 'indicating (y = 0) examples.\n']); plotData(X, y); % Put some labels hold on; % Labels and Legend xlabel('Exam 1 score') ylabel('Exam 2 score') % Specified in plot order legend('Admitted', 'Not admitted') hold off; fprintf('\nProgram paused. Press enter to continue.\n'); pause; %% ============ Part 2: Compute Cost and Gradient ============ % In this part of the exercise, you will implement the cost and gradient % for logistic regression. You neeed to complete the code in % costFunction.m % Setup the data matrix appropriately, and add ones for the intercept term [m, n] = size(X); % Add intercept term to x and X_test X = [ones(m, 1) X]; % Initialize fitting parameters initial_theta = zeros(n + 1, 1); % Compute and display initial cost and gradient [cost, grad] = costFunction(initial_theta, X, y); fprintf('Cost at initial theta (zeros): %f\n', cost); fprintf('Expected cost (approx): 0.693\n'); fprintf('Gradient at initial theta (zeros): \n'); fprintf(' %f \n', grad); fprintf('Expected gradients (approx):\n -0.1000\n -12.0092\n -11.2628\n'); % Compute and display cost and gradient with non-zero theta test_theta = [-24; 0.2; 0.2]; [cost, grad] = costFunction(test_theta, X, y); fprintf('\nCost at test theta: %f\n', cost); fprintf('Expected cost (approx): 0.218\n'); fprintf('Gradient at test theta: \n'); fprintf(' %f \n', grad); fprintf('Expected gradients (approx):\n 0.043\n 2.566\n 2.647\n'); fprintf('\nProgram paused. Press enter to continue.\n'); pause; %% ============= Part 3: Optimizing using fminunc ============= % In this exercise, you will use a built-in function (fminunc) to find the % optimal parameters theta. % Set options for fminunc options = optimset('GradObj', 'on', 'MaxIter', 400); % Run fminunc to obtain the optimal theta % This function will return theta and the cost [theta, cost] = ... fminunc(@(t)(costFunction(t, X, y)), initial_theta, options); % Print theta to screen fprintf('Cost at theta found by fminunc: %f\n', cost); fprintf('Expected cost (approx): 0.203\n'); fprintf('theta: \n'); fprintf(' %f \n', theta); fprintf('Expected theta (approx):\n'); fprintf(' -25.161\n 0.206\n 0.201\n'); % Plot Boundary plotDecisionBoundary(theta, X, y); % Put some labels hold on; % Labels and Legend xlabel('Exam 1 score') ylabel('Exam 2 score') % Specified in plot order legend('Admitted', 'Not admitted') hold off; fprintf('\nProgram paused. Press enter to continue.\n'); pause; %% ============== Part 4: Predict and Accuracies ============== % After learning the parameters, you'll like to use it to predict the outcomes % on unseen data. In this part, you will use the logistic regression model % to predict the probability that a student with score 45 on exam 1 and % score 85 on exam 2 will be admitted. % % Furthermore, you will compute the training and test set accuracies of % our model. % % Your task is to complete the code in predict.m % Predict probability for a student with score 45 on exam 1 % and score 85 on exam 2 prob = sigmoid([1 45 85] * theta); fprintf(['For a student with scores 45 and 85, we predict an admission ' ... 'probability of %f\n'], prob); fprintf('Expected value: 0.775 +/- 0.002\n\n'); % Compute accuracy on our training set p = predict(theta, X); fprintf('Train Accuracy: %f\n', mean(double(p == y)) * 100); fprintf('Expected accuracy (approx): 89.0\n'); fprintf('\n');