Add files via upload

Author: jwlee-ml

tf_2.x/lab-05-1-logistic_regression-eager.ipynb

@@ -52,7 +52,7 @@
    "outputs": [
     {
      "data": {
-      "image/png": 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\n",
+      "image/png": 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\n",
       "text/plain": [
        "<Figure size 432x288 with 1 Axes>"
       ]
@@ -273,7 +273,7 @@
     "\n",
     "for step in range(EPOCHS):\n",
     "    for features, labels  in iter(dataset):\n",
-    "        grads = grad(logistic_regression(features), features, labels)\n",
+    "        grads = grad(features, labels)\n",
     "        optimizer.apply_gradients(grads_and_vars=zip(grads,[W,b]))\n",
     "        if step % 100 == 0:\n",
     "            print(\"Iter: {}, Loss: {:.4f}\".format(step, loss_fn(logistic_regression(features),features,labels)))\n",
@@ -305,7 +305,7 @@
    "name": "python",
    "nbconvert_exporter": "python",
    "pygments_lexer": "ipython3",
-   "version": "3.7.3"
+   "version": "3.7.6"
   }
  },
  "nbformat": 4,