[br]Die Seiten des Quadrats haben eine Länge von g + h.[br]Das Quadrat besteht aus 4 Teilflächen.[br]Der Flächeninhalt kann berechnet werden, indem man (g + h) quadriert, also A = (g + h)².[br]Der Flächeninhalt kann auch berechnet werden, indem man die 4 Teilflächeninhalte summiert, also A = g² + 2gh + h².[br]Daraus ergibt sich die Formel (g + h)² = g² + 2gh + h².[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAb8AAAG7CAYAAABTgptkAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAC0rSURBVHhe7d0JmI1lG8DxMGPMMPZ9p2RJhJAoQiWhyBL1iXwla4uSkC37nmXs+77vSyRKUkKpvjbZ9zWSkLi/63lO53DumTI0M815zv++rt+lvO85aeac+XvXc5swDMMwTJDNbfo3GIZhGMb1IX4MwzBM0A3xYxiGYYJuiB/DMAwTdEP8GIZhmKAb4scwDMME3RA/hmEYJuiG+DEMwzBBN8SPYZiAmqtXr8rly5d9rly5oldhmBsO8XNozp8/L99++628//77cvr0ab2YYZyYzz//XEqVKiX58uWT22+/XaZNm6ZXYZgbDvFzZL7//nt5+umnJTQ0VAoVKiRffvmlXoVhnJgPP/xQUqVKJbfddpv17rvv6lUY5oZD/AJsdu3aJYsWLZKxY8das2fPlk2bNkmVKlV8Pwxy5Mgh//vf//RDGcaJ2bhxo2TKlMm+1pMlSyYjR47UqzDMDYf4BchcvHhRBg4cKKVLl5YkSZL4QueNndniq1q1qvTp00dmzpwp586d00/BME4M8WPiYohfAMyFCxekc+fO9o3uDV61atWkfv36kiZNGt/vma2/S5cu6YczjFND/Ji4GOIXAPPRRx9JSEiIfbObLbwhQ4bYE1p++eUXWbFihT3w7/1BMG7cOP1whnFqro+feV9MmDDB/gVx+vTp8uijj9pj3kazZs1k27Zt+uEMY4f4BcAMGjTIt3X3wAMPyPHjx/2WN23a1Le8bt26fssYxrW5Pn5hYWHSoUMHefbZZ33vgevlz59f1q5dq5+CYYhfIEy3bt18b+ZatWrJ2bNn/Za/8sorvuWVKlXyW8Ywro3e7ek98zMyMlKKFCkiGTNm9AtgjRo1uPSHiTbELwDGnMDifSPnypVLtm/f7lt28uRJKV++vG95+/bt/R7LMK7N9fHzqlevnixdutSe5bx8+XIpWrSob1nWrFllx44d+mmYIB/iFwBz+PBhqVixou/NXLJkSXtsb+LEifYYh/f3zQ8Eru9jXB8dv0aNGkU7u7lfv36+5ebs6A0bNvgtZxjiFyBj/uZ69913+/1t93q5c+e2W4gM4/pcH7+kSZPK6NGj9Soyf/58v/fHunXr9CpMkA/xC4Axly+Yv8maYxp33HGHvZ7PHNu488477S7Pnj17yjfffKMfxjBOjj7mFxUVpVeRBQsW+MXvgw8+0KswQT7ELwBm1qxZvjex2dXJMME8On4xXeent/yIH6OH+AXAmAvcvW9ic6mDOftzwIABPsOHD5e5c+fa+3syjOtD/Ji4GOIXAGNOYilWrJjfm1kz1zsVL15cWrRoIYcOHdJPwTDODPFj4mKIXwDMH3/8IS1btvS9kc0b3tzZwjB3fNEhbN68OZ9xxjg7xI+JiyF+iXxM+F5//XVJnTq1fRNXr17dvrHXrFkjK1eutHevMLd3MifAeN/oBQoU4AQYxtkhfkxcDPFL5GPu3+kNnzF16lS9ip22bdv61ilYsCDxY5wdEzJziYP39W4+7UTPjBkz/OL33nvv6VWYIB/il8jn119/lTx58vjexGXLlrVnfK5evdpu/a1atcp+mKf35tZGgwYNol30yzCuzE8//SRvvvmmtGrVSlq3bm0/3FbPF198YZd7/fDDD3oVJsiH+CXyMcfuJk2aJOnTp/f7m2xERIS97i88PNzv983ZoF9//bV+GoZhGOa6IX4BMuY4h7l7feXKlaMFL2/evPYWT+ZOF/v379cPZRiGYdQQvwAac/LLqVOnZPfu3bJz507L7AI6ePCg3T3KMAzDxG6IH8MwDBN0Q/wYhmGYoBvixzAMwwTdED+GYRgm6Ib4MQzDMEE3xI9hGIYJuiF+DMMwTNBNwMVv06ZN0qNHD+ne3egOxJp53XheO9GXAXBDjz/f659++qnOh98EXPy6dOnid3cTAAC0Xr166Xz4TcDFr0+fPvZ/rM3A5yVqfR8ZvKIrcEOjN/aTUpWK2tdOywmLpePyLdJ+4UYADnl79RZp+M4w+z4fPGiQzoffBGz83l3zjmyWZfL+2bnADW2RlVKl3v32tTNox3GZ+rPIhKMAXDLzvNgIOh2//ks6y7pf5sqyQ1OAG9rw2wKpVLusfe30/mS3jD0gMvKnCwAcMvGYyCsz3iN+gBfxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET/4WX54qqw4Ok1W/mnFkWn29/R6LiN+gPuIH3xs9I5Nt/+85MBkWXpgsg3fquPTZcWR4Akg8QPcR/xgmfAt2T9J2o9qKaWrlpBMOTJItrxZ5KGnykvPOW/a5cuDJIDED3Af8YNvV2eTTvUlNHmI/ZpdLzJdKnkjqqW8d3JmtMe6iPgB7iN+kFXHZ0jUh30lVZoI+/UqXLqAtBveXFr3b2q3AM3vFSx5uyzaM8EeB9SPdw3xA9xH/GC36LrPfF2y5M4kOfJnlSEru8rGS4vl48tL5LH/PGS/hnkL55Sp29+1x//0411D/AD3ET/YY3kz/xclQ1Z1kxHresmSA5PkvVOzZN7OMVL0vkL2a1i8QhFZvHeC3T2qH+8a4oebsuuijN53Rcbsv2qN2nM5+jpIdIgfLHOW59ozc+T9s3OtSduGSsXa99mvn9kd+ta4NrKaY36Av10XZcSP52Xg9qPS//OD1pCvT0VfD4kO8YOPOZ637pd5Mvz9nlKsfBFf+Fr0bmzjGCzX+xE/xNbYgyK9N+2W20uVk/DINNYjzV+XYd+fYwswkSN+weywZ4vPXMNnfl3z82x5e9IrkqtAdvt1u6NYXumzsKOs/3W+vH9mTtBc60f8AlfU7ksyeu9lu0Wml8UHE79eG3dKtjs8hweMiv9pQfwCAPELUmYXptm9Of+ncbJwzwRZsn+ivNS7saSMDLdfs6x5MsnrI16SMR/3l2FresrID3rJ3B/HBEUAiV/gGbX7kv1hNmrP7zLoy2N2V2RCBNDG7+OfJGehu33xe6hJa+IXAIifw8xuSrMr05yhaS5nML+aLTxzdueID3rJ402qSvEH7pKO49tKx/FtJEmSJL43cOr0qSRPoZz2DNBMOTNK4XsLyJBV3eW9U+4f9yN+idSuizZuo/f+IaP3/WnvZfv9effbM1K/21ApVuVxub/ec9J/6yEZs+9K9OeIY38XP/PnHLX3st+fNSoBgozY+Vfjd/XqVTl+/Lh8/vnncubMGb34H08wx88TvOmyeN9EmbdzrMz7caz9dfnhKTJoeVcbNu+btUmnBtKyz3MSGhYqKVKGWeafTQytpEkkc86MMmDZ27Lm9Kxo/y3XEL/Ex+zONGdSjtj5mwz95rQM/uqkNfyHczLk65NSsXFL3+s5Q8680nvzHhsm/Txx7a/iN/Kni54of3fW92c1gTYBtLtlY3guJKx/LX5Hjx6Vdu3aSaZMmeSuu+6yAYzrCdb4rT4xU+b9OEbajXhJKtQoI2kzppaIyHBJnyWtVKhZRvIXzWO/LtnzZrHH994c3cpuEU77cthfmvH1CFm0d2JQnPRC/BIXs7VndiG2X7RJqjR7WXIWLibhqT0nl+S9p7SUqlFPkoaESKr0GSXr7YWkwtPNZNCXx+3Wln6uuBZT/B5+sZ3d9fr80ClSuEJVicyY2SpQ5gH7e8N/PE8AE4F4j9+JEydk8+bNsmLFCuuDDz6Qb7/9Vho1auR7saRJk4b4xZHVJ2bYUD301P2+r6/9GmeI9Pv3dJnSyKAVXWX1yRl2a9DsHjXHAf/SiRnc2xMJLmqXOYHlD2k6ZIqky3ptb0VYeEpJkSq179+TJElqo2O2DEfvif/oecUUv9K1Gsj99Rr7vd+8QpKHSe0OvWX0nov2/00/HxJOvMZv1qxZUr16dUmd+tqL1ChUqJBERETIvffeK23atJFBgwbJyZMn9cP/8QRb/EzAzCcx1Gtdw/e1Nrcna9Kxvgxa0U1aD2gq2fNl8fywSJpEHmtc2R7DC4YL128G8Us8Jhy5Kq/PXS+RGT2v26TJQqR0rael9aSl0nbaKrm3Rn1JkjSp57We9w7pvHKbTDhy898vcyzOHo+7yWNyMcUveVgKz6/hEZKvRFnJku9Ov59/mXLnl04rPpdxh27+z4m4Ey/xu3LliowaNUoiI69tbZQqVUoeeeQRCQsL8/1e5cqV5cKFC/rhcTbBFr81p2bKpK1DfIEzmnVpZC9V+ODcPPno4kJp2a+JhIUnt8vMySxTtg8NiluW3QzilziYGJmQPdqive/1nKtwMRnyzWmZdEIsc3F51usuM6jTsZ9MOi43dWKJ2T1qQjT+sNjv9c08Nqb4GcWq1pQ2U1ZIz4075e3V26XkY7V9y5KFhMjzQ6faP79+PiSceInfV199JWnTpvV9s9944w3Zs2ePHDt2TObMmSN58niOOZmTKcaNG6cfHmcTbPFb+/NsGfVhX7+zNvsv7mzDt+zgFHut3sDlXSRD1nR2WdpMaaTX3A5BcRLLzSB+iYM5U3LEjxekXN1ruxDNVp8JjtllaM/83HdFSjz6pG+5ucYuarfnrFD9fJqJnNml+uaij6V41ZpSoOyD0vCdYTLsu7OxerwRU/wK3l/JnnAz5ZTY5ZNPibSauETCUqbyrfNUp/4y5TSvq39TvMRv/Pjxvm/yPffcI3v37vVb3rx5c9/yWrVq+S2Lywm2+JmIjds8wF6m4P36to9qKR/+tkDWnJ4tGy8tspc1pEqT0i7LkC29RG3oY4/n6ecKZsQvcfCc4XlFKl13JmfB+yrZKI4/IjLhqNjr+fKX9NyGz6jeppOMP3I1VltvJnyDvjgmOQsX9z0+JDS5tJq4VMYeuhqrXaAxxa/y821lpI2z56QWc8lFx+VbJDJ9Jt86tTv0IX7/sniJX79+/XzfZLOrUx/P69atm295yZIl/ZbF5QRb/MzuywW7xslDda6d7FK0XCEZsPRtmf3daBm6ursUK1/42te+0t32cSuOBseJLLFF/BIP8wPqhZGzJFmoZ1d9eGRqebr7u9L3s312l2Ktdt0lNIXnxgzJI1LaXY0Tj8bu+2Wi9NaST+3JMt73hFG30wAZs/8PG1/9GC3G+DVt43eRu/3vqPjVeasv8fuXxUv85s2b5/sm58qVS7Zv3+5bdunSJalZs6ZvebNmzfweG5cTbPEzzNaf2fVpLkr3fo1TpU1pQ2c+lNb3fSmQXQav7OY5izOG5wlmxC/xiNrt2f1Y45WukipdRt/rN3+pcvaSB++/m+Noj7ftbLfWvI+5EbMFOXjHCSlYrqLvedJmyS7t5q6XMQdit/UYU/z0HV5s/JZ9RvwSmXiJ3+HDh6VsWc8PD+PBBx+0QVy+fLk0bdpUkif3/C3OnPyybt06/fA4m2CMn7leb8Hu8VK9cWXP1/jPk1u8MuVIL5XrlpfBK7rKmlOzguK6vZtF/BIPEyATmJfGzJPIDJnt9yTZnz8/DHPpQIGyD0jDd4Z7LiK/mWv77DG/y9J17VdS9b+vSKXnWkrrSctl9J7LsdrqM4hf4IqX+JnZsWOHlChRwvfNNsFLmdJzrMkwZ4IOGDDA3uUlvibY4md2e5q7uNR8vqqkiAizuzj7Luhod3v2ntdB+i7sKKM39pOlByfbr8eKI1ziEBPil3hMOHpFXho7X9JlyylJbksi9bsOkY7LPpOXZ7wnL09/T95cvMneyswc/7vV75O5c4w5/ucN7c1cf0f8Ale8xM8Ebdq0aZI1a1bJmDGjjWCWLFkkXbp0UqBAAXttn7nYPT7DZybY4mfP9vyor+8Ndne5QtJvUSdZtGeCvXm12SI0N6c2tzoz/+y9z6d+nmBH/BIHc8Zl1O4LUrbOM/Z7Ye7i0vCdEdLn070y7LtfZOj/frafnTdox3F7+zBzgbuNVyy32vz+W7vNXWR+j9VJLtcjfoErXuK3Zs0aCQkJ8Tzp4MF6cYJNsMXPXLBurtvLW9hzJwxzyUNIaIiEhYfZLUGv/EVyS6U65aTtwOdl5jcjZRVne/ohfomD/XiifVc8J7X8eeG4ucjdnOCSPDylvYjcSJ0pqxS6/yF7puebiz/x3A7tFgJ4K4hf4IqX+PXq1cv3TTZne44dO9Ze3+e1YMECWb9+vezfv18/NE4n2OJnPp/v/TOzpdu0dhKeyvPD4kbMvT7nfD9aVnKhuw/xSyR2/iZjDogM/eZnKVqpWrTXbkzSZMkmL09fJWP3X7nprbhbMfaQSM+PfpT02a7deu3++k2ixc/snk163VmlNV7tKlN/5nX1b4qX+G3btk2KFPF8EvhfMbc8q1ChgnTo0MF+skN8TLDFz+zGnLL9Xala/wH7Cezm/918ZFG1ZypJ1QYPyCNPV5RKde63n9Xn/T6EhCaTtoOayYbz86M9X7AifomD2fKL+umiNB06RXIULGq/H2mz5pBydZ+TcvWes7+a0BQs95Df5Qp3P1Td3lg6IT7SyJwxam6i/UzvKKn5WjerzeTl9vpD77FDs0u176f7pG6n/r513pj/kYw7xM2t/03xEj8z7du397vTyN9p2bKlvSVaXE8wxc98yKw5gaVZ12s3DL+nYlGZ8sUwuzvUnNVp1ll+ZJp0mfKq70J3o2G7J+0F8Po5gxXxSxzGH74qb6/+QjLk9NwRypzl+d8RM2Xs/queMO66ZANnjgEWq3rtfrbZChSRXgn1fdv5m/2zmFuVmd2YhrlNml7PbAWaO7141xl3UOwxSr0eEk68xM8c58uWLZuNX5kyZSQqKkpmz55tT4Ixv5rl5sQX74s1d+7c9uzQuJ7gip/nzM26193UOnfBHPaz+8ynMSzeP1GWHJgkC3dPkFb9mthjf971Xnv3RXv/T/2cwYr4JQ7mvp7mmruI1J5bJZobWD/ZvpcM+/4XGf7jrzL8+19l5K4L0nHFVnsDae/r+Z5Ha9vr98zxQv2cgFecx+/333+XnDmv7f8eOXKkXsVOx44d/eK3ZcsWvco/nmCKn9myM5c6dJ36moSnvHa8z1znV6xCEbm3cnEpXfUeyVckl2+Z8UCtsvaYHze3vob4JQ7mEoS+n+2X4o884feazXpHYXsM8K4HH5EiDzwsKSKvfWpMeOq00nryMhl3MGGO+SFwxXn8Ll++LPnz5/e9GM0F7kuWLLFxM8cCzef2zZ8/397WzLtO1apV5dSpU/qp/vEEU/wMs1vT/Np+VEspUuZOSZPR/6OkfD8gUqaQvIVzSY2mD8u0HcO4t6dC/BKPsQevSo/138l9dRtL1tsLStI/P75IS58jtw1hy/GLr122EMPzAV5xHj8z+uOMjMyZM0v27Nnt9X7X/37BggXtNX/xMcEWP8Ps4jQ3sTZbcz1mvi4vvvOM/Xw/szvUeO6tetJpQlsZu6m/3drjLM/oiF/iYrYAzYklnVZulcb9xkn1Nh3lkeav+/yn31h5fd6H9ro/+1l+bPEhFuIlfmbMp7a/9NJLUrp06Wh/SzMfd2QugejSpUu8HOvzTjDGz8uc+Wk+wmj9+fn2c/y8zA/2dWfn2k9n59ZmMSN+iY85qcRcUzfx+LWTRrzM75nP4/NeWgDERrzFz8zFixfttXxmV+cnn3xibd68Wb7++mv72X7xPcEcP9w64ge4L17j928P8cOtIH6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7gvKOI3cHkX+wNt5bHpwA1t/H2xPFTnPvva6fvZfhl/RGTU3ssAHDLllMhrs993O359F3aUNadnyeJ9E4EbMnsJKj5Zxr52em78UUbtuSzDvz8HwCHjDl2WtlNXuhm/vn372v+xFGmTS0TmcInImAK4oZSZwyUkLJl97YSmySih6bNIaLrMABySPH1mCYlM64nf4ME6H34TsPG7I/PtUjL3PVI8ZzHghkrlKSFpIzxviuL5c0qZgnnl3jvzAHBImUL5pGCuLG7Gz7vbc3XXJXJ54Vk5Pf0QcEOy5Lw8Va62fe0cXj1F5Ov3RLYtA+CSH9bJhrG97ft80CBH47e00zw5N/uYHJ60C7ihC/NOyZNla9nXzu6l40W2LpMLnywA4BD5apWsGdnD7fgt6ThXfpl1VA5N/Am4od/mnvTFb9eScXL186Xy26b5ABwiO1bKeyO6Ez/Ai/gB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8cL1LmxeKfLFc5H9rPL5eLbJ1qVz4ZEG0dRE4iB+gED8Y5zfNlz+2LJYzG2bLine7SKdmDeTN556S/i83lU8nD5TfP1tkw6gfh8BA/ACF+MH447PFcmztNGlV/3HJlC61fT143ZEru0R1aGHXI4CBifgBCvHDxc0L5OrnS6R/2ya+4N1b+A5pUrOK5MmW2f57yvAU8tG4vnJ1K6+PQET8AIX4wezuPL52mtSudJ99HdR4oLTsXjpOLu1YKfP6dpDQkGT298d0aiWXP1ssFzn+F3CIH6AQP/z+6SI5uW6GTOr6srz2zJOyfkwvubJlicgPH8jq4d0lMiLcvj6m9nhV/tiyhJNfAhDxw005OHGnnJi6X87POWkjcX7OCTk+ZZ8cnLAz2rqBivi54fzHZvflQpEvV4p8857H9uXR1vsrJmhml6Z8scK+BmT7Mvlm7gipfG8x+9oolDeXfDtvpN09qh+LxI/4IdYOT/xJjk3Za7+ejSo2kHrl68h/KjWUtd2Xy6npB6OtH6iInxvMCSsHVk6SLi88Lc8+Vska3bGlXPp04U1tqZn1TTTXj+ktxQrkta+L7BnTy5JBnezWILs8A1O8x2/ZsmVSsWJFuf/+++Xxxx+XzZs361XibYIhfkcm7ZbDk3ZF+/34YOJ3atpBGdi0t/26ek1oPUrOzT4ebf1ARfzcINuW2i2zQnlz+l6r9auWl8ufLYp1sMy6ZutvWo/XJE/WTPY57ru7kLwf1dMG0Rwb1I9BYIj3+EVFRfleeClSpLAxTKhxOX5mC+zszCN2F+SRBIzfyWkHZNgLAyVF8hT2a5sqRSqZ+sp4+WXWsWjrByri5wZzIfr3C0ZJ2aJ3+n4GNa1ZJdbxM8f9zn00V7q80FBShCW3j69WrqRsnzHUng169sPZln4cAkO8x2/8+PGSPLnnhZMpUyZZtWqVXiXextX4meDtG/edLOwwS3r/p7ss7jgnQXY7Ej8Ekn8SP7POqQ9mSJsGNXyPDUseKvWqlpeXnqomz9eqKs/VqGy3CH/9eJ6NoX4OJG7EL5EyoTk+dZ+cnXVULsw9JRfmnba/mh/MP436Wl58pKmEhXi+rq0ee1Euzf852nPEtb+Ln9nteXr6IXsijPfPembmETk6eU+050nsiJ8b/i5+5iQV2bHq2i3Ldqzy24Vpbme2ZeogiUgR5ntsTJo9UVV+3TjPHhfU/30kbsQvETLH8czW3daBH8vQ//aX56s2lsYPNZJmDz8n7/53gDSt2tjvDfhmndfkwtzT0Z4nrv1V/Ga1m2yjN/eNafJyzVbSpPKz8uKjz8v4ViNl95hv7S5a/VyJGfFzQ0zxa1arqj37c+fC0TLg5abSvE41q1/bJvLd/CgbQHMyjLl12eHVU2RCl7YypN1/r3nN3/rRvexZpTdzAg0ShwSNX+bMmWX9+vXy+++/y8yZM6VevXpSpUoVqVatmgwePFh+/vln/fB/NIEYP7OlZIxsPlgK5yokyUNC/UKXLGkySZIkqaRJmUYGNOklCzrMlG2DNiVIYGKKX9pUaWT4CwOlbY2WkiEyvd+fNXVEamlQoa58N2J7QG0BEj83xBQ/s7tyVu83/E6C8Sp+Z15ZNayr79IFe0NrcxNr79ZhTLYvi/bfRWBI0Phlz55dRo4cKY0aNZLQUP8f6iEhIVKzZk3Zv3+/fopbnkCLnzlr0+zqHNc6SiLCPBfRGqVuLyHta78qj5eqJsmSJrW/lzw0ufRr/I5cmn/GBikhrrOLKX4mcDkyZPf9WcNCo+8mal/nNTkxdV+CnZX6TxE/N+j4mfdO3myZJSSZ5+4soaEhkjw0xO+1Wu7uQp7vObcsc16Cxs+c7Zk+vWfrIDw8XLJly+Zb5tW5c2e5cuWKfppbmkCLnwnEdyO3ywNFKvi+HnXvry0/RO3484SWndLysRfs1p9ZdmeOAvLDyB1ybPLNbfX9POOQPSbnu0B9YuzCGVP8vO7KXUS6N+wsY1oOl+erNJaUKVL6lhXPV0wOTdxld+fq50yMiJ8bdPy80kamlJZ1q8uU7q/I0HYvyB05s/ktXzmsm72wXT8f3JKg8TOSJEkitWvXltmzZ8uGDRukb9++ki5dOt9ycz3gmTNn9NPc0gRa/E5PPyifDthgj6N5vx6T246VX+eckCOTd8u5Wcdk0VtzJGu6LHZZxtQZ7BmfJkj6uf6KOZa4rscKGfx8XxnXaqR8O2K7DaBeLyZ/Fb9aZR6Xb4ZtlTMzjtgTdPaM+VYeK/mIb3nuTLlkawLtmo0LxM8NMcUvR+YMsmJoF7tMti2zuy3NcT3vciPqrRZy5XNuWea6BI2f2dXZqlUruXjxom/51atX7W5Q7wsvQ4YMcuTIEb/nuNUJyPj13+C3y3PaKxNs/MwuQ3M5wdJO8yV7es/fVDNEZpD57WfEOn5mPXM3FrOV5n1+syVptvxis1UWU/zCQsJk2qsTfGebmj+n+fO2eOzFaz9wMmaXj3qvtbt09XMmRsTPDTHFr9GjD9oTXszxvAufmAvhl8nnUwfbv5R71xnwyvP2hBcuX3BbgsbPhG3t2rV6FenRo4fvhWd2jR46dEivcksTaPEzuz2/HbFNyhUs6/t6PFuxoewd972cmXHYbrW1qt5cQpN5jpfmz5rPbrnFdrfnhXmnpMVj//U9t5EvSx4bJnPnFr2+FlP8IsMjbfyuv87PhNCc9en9b+TMmEM29nmf+CFBxRS/Zk887Hedn4nfN3NH+sVv0KvNiF8QSND4mbM9V69erVeRXr16+V54ERERQRs/s9Vk4jKhzWiJDPfs+jShq1i0gnR7upNUL/WohP559qf5/W4NO9ugxPZEkl9nH5cuDd7yfa2NEvmLy5YBH8nJafujra/FFL+YLnK/OO+0PfvT+98gfvg3xBQ/fZG7id9Xs4cTvyCUoPH7q+v8evbs6XvhBXP8DLN1d3TKHmldvblfpK6XLV1We23fgQk/3tQlBOaYm9lSrFf+KcmTObfclbuwTGo7Jta7TYkfAgnxw98hfomI97jbxDZjpFCOOyVH+uzywsNNpEGFp6TGvY9JnXJPyFt1X5dVXRfL0cm7b+kEEhPLfeN+kM39N8hX727xbDlOjN2WI/FDICF++DvELxExYdk+eJPvhJZH7qliL3OQlVdElv8hsvx3kSUX7DE1c+uwm9nleT1z5qg5w9PEM7bhM4gfAgnxw98hfomI92zP8D/DkiYitZS98157KcGTZWvIE2U8zEkvQ5r1l0191tkYxeZMzbhA/BBIiB/+DvFLRMwuSROyHo3e9l3I/lfCw8IlT6bc8nb9DnJ40u4ECaA3fuYaQe+fI2mSZPa44blZ1z7Pz2yZtqj2gm+dDKnTy4dc6oAEZuJn7tfp/QBao1G1B6PF78tZw/zeW33bNCF+QSDe42duZ+Z9UZnr/JYuXapXsXd1uf7Fd+DAAb3KLU2gxc/7wbTDXxwsWdJmtn/21BGRkiN9NnuSi9kdan7/+jCmS5VWpr86Uc7OjP//PxM/c0LO5LZjpGieu+TO7HfIPfmKyYIOs+xuWO965s4xPRq+bZcbD9xVXj4b8OEtHaP8NxA/N5h7dO5aMlbqP1zB3svTeKtpXfs5fd74mduYma3Dwvly+daZ2PVluWTWIX5Oi/f4rVmzRp588kmpUaOGPPPMM7J161a9isyZM8cuN5566ik5deqUXuWWJpDiZ469meNwk18ea3cpJrktib0zyoQ2o2Rzv/Wyoddq+bD3GvngnZX2Pp8RYRG+ALZ9vIVcmhf/H2l0PRNpL73MLp94bflfrZNYET+3mDu1XE8vj7ZODMvhnniP3785gRQ/s9VntL3u4vDyhcrJj+aEl8Xn5eLc0/ZY2h8Lz8nKLoslY2QG33pv1mlnP0NPP2d8MTEzZ5t6PoHCs7Ua8zqeT6gwJ9jo5YkZ8XPLxc0L7R1djL/6EFvvcs+dX2JeB24hfomEiYXZLTiwaW9f1IwH76og3Rp2kl7PdJXez3aXV2u1kbvz3OVbbi6HWNt9mf0gWf2cuDXED3Af8UtE7EXow7fJfyo2lJBk/h+1opndoub2ZtNeGR+ru7Mg9ogf4D7il8gcn7JX9o373n4qeovHXpDyhe+TnBmy25NdjKK5i8gzFRvI4KZ95ZN+6+1xwoQ40zOYED/AfcQvETJbgN4PfzW3MDMx9No//ofr1tkf4/E2/DPED3Af8UukzNmSZovOnDBybIqx1/KeQEL04g/xA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH3ED1CIH+A+4gcoxA9wH/EDFOIHuI/4AQrxA9xH/ACF+AHuI36AQvwA9xE/QCF+gPuIH6AQP8B9xA9QiB/gPuIHKMQPcB/xAxTiB7iP+AEK8QPcR/wAhfgB7iN+gEL8APcRP0AhfoD7iB+gED/AfcQPUIgf4D7iByjED3Af8QMU4ge4j/gBCvED3Ef8AIX4Ae4jfoBC/AD3ET9AIX6A+4gfoBA/wH1BEb9lnefL+Tkn5OjkPcANXZr/s9S+7wn72tm7bILI9uVy6dOFABwi36yW96PecTt+i9+aI2dnHpGDE3YCN2T+ouTd8vtp8Vi5smWJnP94HgCHXP1yhawe3s3N+HXv7tmkTRWSUjJFZJQM4emBG8qcMqN93RjpU4VLlrSpJHOalAAckiVtpESmCLXv8759++p8+E3AxW/q1KlSrlw5KXFvSSlesjgQK8VKFpfSZUrb107xEiWl2D0lADioRMlS9n0+a9YsnQ+/Cbj4MQzDMMw/HeLHMAzDBN0QP4ZhGCbohvgxDMMwQTf/B8gNk4ePTvjmAAAAAElFTkSuQmCC[/img]

[br](2a + b)² = 4a² + 4ab + b²

[br](x + 3y)² = x² + 6xy + 9y²