Sobre la funció quadràtica (2)

Vèrtex d'una funció quadràtica

Quin és el vèrtex d'aquesta funció quadràtica [math]f\left(x\right)=2x^2+12x-1[/math]?

(-3, 4) (-3, -19) (0, -1) (2, 31)

Si una funció quadràtica és té l'expressió general [math]ax^2+bx+c[/math], com es troba la coordenada [math]x[/math] del vèrtex?

[math]x=3[/math] [math]x=\frac{b}{2a}[/math] [math]x=a+b[/math] [math]x=\frac{-a}{2b}[/math] [math]x=\frac{-b}{2a}[/math]

Quin és el vèrtex d'aquesta paràbola, aproximadament?[br][br][img]data:image/png;base64,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[/img]

No té vèrtex. (6, 0) (3, 25) (3, 17) (2, 15)

Punts de tall amb els eixos d'una paràbola

Digues quines opcions són correctes:

Una paràbola sempre talla l'eix Y. Una paràbola sempre talla l'eix X. Si una paràbola només talla l'eix X un cop, aleshores el vèrtex és el punt de tall. El punt de tall amb l'eix X d'una paràbola té coordenada y igual a 0. El punt de tall amb l'eix Y d'una paràbola té coordenada x igual a 0. Una paràbola talla l'eix X les mateixes vegades que l'eix Y. Una paràbola talla l'eix X com a molt 2 vegades. El punt de tall amb l'eix Y d'una paràbola té coordenada y igual a 0. El punt de tall amb l'eix X d'una paràbola té coordenada x igual a 0.

Aquesta és una paràbola:[br][br][img]data:image/png;base64,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[/img][br][br]Escull les opcions correctes sobre aquesta paràbola:

(-1, 0) és un punt de tall de la paràbola amb l'eix Y. (-1, 0) és l'únic punt de tall de la paràbola amb l'eix X. (0, -6) és un punt de tall de la paràbola amb l'eix Y. (0, -6) és el punt de tall de la paràbola amb l'eix Y. Els punts de tall de la paràbola amb l'eix X són (-1, 0), (0, -6) i (2,0). Els punts de tall de la paràbola amb l'eix X són (-1, 0) i (2,0). (-1, 0) és un punt de tall de la paràbola amb l'eix X.

La gràfica anterior de la paràbola correspon a la funció [math]f\left(x\right)=3x^2-3x-6[/math]. Selecciona les opcions correctes:

Les arrels de la funció quadràtica [math]f[/math] són -1 i 2. L'arrel de la funció quadràtica [math]f[/math] és -6. La funció quadràtica [math]f[/math] no té arrels

Aquesta és una 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[/img][br][br]Escull les opcions correctes sobre aquesta paràbola:

(0, -2) és un punt de tall de la paràbola amb l'eix Y. Els punts de tall de la paràbola amb els eixos són (-1, 0) i (0, -2). Els punts de tall de la paràbola amb l'eix X són (-1, 0) i (2,0). (-1, 0) és un punt de tall de la paràbola amb l'eix Y. (-1, 0) és l'únic punt de tall de la paràbola amb l'eix X. (-1, 0) és un punt de tall de la paràbola amb l'eix X. (-2, 0) és el punt de tall de la paràbola amb l'eix Y.

La gràfica anterior de la paràbola correspon a la funció [math]f\left(x\right)=-2x^2-4x-2[/math]. Selecciona les opcions correctes:

El punt de tall amb l'eix X de la funció quadràtica[math]f[/math] és també el seu vèrtex. Les arrels de la funció quadràtica [math]f[/math] són -1 i -2. La funció quadràtica [math]f[/math] no té arrels L'arrel de la funció quadràtica [math]f[/math] és -1. L'arrel de la funció quadràtica [math]f[/math] és -2.

Aquesta és una paràbola:[br][br][img]data:image/png;base64,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[/img][br][br]Escull les opcions correctes sobre aquesta paràbola:

(1, 0) és el punt de tall de la paràbola amb l'eix Y. (0, 1) és el punt de tall de la paràbola amb l'eix Y. L'únic punt de tall de la paràbola amb els eixos és (0, 1) (0.5, 0) és un punt de tall de la paràbola amb l'eix Y. (0, 1) és un punt de tall de la paràbola amb l'eix X. la paràbola no té punts de tall amb l'eix X.

La gràfica anterior de la paràbola correspon a la funció [math]f\left(x\right)=2x^2-2x+1[/math]. Selecciona les opcions correctes:

L'arrel de la funció quadràtica [math]f[/math] és 1. El punt de tall amb l'eix Y de la funció quadràtica[math]f[/math] és també el seu vèrtex. La funció quadràtica [math]f[/math] no té arrels. L'arrel de la funció quadràtica [math]f[/math] és 0.5.

Càlcul dels punts de tall amb els eixos

La funció quadràtica [math]f\left(x\right)=3x^2-3x-6[/math] té aquesta 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[/img]

Per a calcular els punts de tall amb l'eix X d'aquesta funció quadràtica s'ha d'usar la fórmula per trobar la x:[br][br][math]\frac{3\pm\sqrt{\left(-3\right)^2-4\cdot3\cdot\left(-6\right)}}{2\cdot3}[/math][br][br]i dóna dos resultats -1 i -6, que són les arrels de fa funció quadràtica. [math]f\left(-1\right)=0[/math]. Per a calcular els punts de tall amb l'eix X d'aquesta funció quadràtica s'ha d'usar la fórmula per trobar la x:[br][br][math]\frac{3\pm\sqrt{\left(-3\right)^2-4\cdot3\cdot\left(-6\right)}}{2\cdot3}[/math][br][br]i dóna dos resultats -1 i 2, que són les arrels de fa funció quadràtica. Per a calcular el punt de tall amb l'eix Y s'ha de calcular [math]f\left(0\right)[/math] i dóna -6. Per a calcular el punt de tall amb l'eix Y s'ha de calcular [math]f\left(0\right)[/math] i dóna -1. Per a calcular els punts de tall amb l'eix X d'aquesta funció quadràtica s'ha d'usar la fórmula per trobar la x:[br][br][math]\frac{-3\pm\sqrt{\left(-3\right)^2-4\cdot\left(-3\right)\cdot\left(-6\right)}}{2\cdot3}[/math][br][br]i dóna dos resultats -1 i 2, que són les arrels de fa funció quadràtica. Per a calcular el punt de tall amb l'eix X s'ha de calcular [math]f\left(0\right)[/math].

Els coeficients d'una funció quadràtica

Si una funció quadràtica és [math]f\left(x\right)=ax^2+bx+c[/math]. Tria les opcions correctes:

Aquesta paràbola té el terme independent, que és [math]c[/math], positiu:[br][br][img]data:image/png;base64,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[/img] Si el coeficient del terme en [math]x^2[/math], que és [math]a[/math], és negatiu, aleshores les branques de la paràbola van avall, d'aquesta manera:[br][br][img]data:image/png;base64,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[/img] Aquesta paràbola té el el terme independent, que és [math]c[/math], positiu:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAARcAAAEfCAIAAADk4hXuAAAAAXNSR0IArs4c6QAAGwpJREFUeJztnW1wU9eZxx+92JZs2ZYjx8JAcIiDTELWCjHBCybQTlJDSGfbBjttJ91tsmHZnSTMzize0qaZ7ky324bUfKKZnfWS5mUmTVgcT7MtCS/JbgIxrJWAkZMQrEQBAbGRsbGFZUuWLN39cK8vAoyxfaV7zr36/z5dZJDO2Px8nnPO8zzHIAgCATBbXC6Xz+djPQrGGFkPAADNA4sAUAosAkApsAgApcAiAJQCiwBQCiwCQCmwCAClwCIAlAKLAFAKLAJAKbAIAKXAIgCUAosAUAosAkApsAhMTnNzs8vlcrlcjY2Ng4ODrIfDNbAITILH4yEin8/n8/lqa2tffPFF1iPiGlgEJmH58uVNTU3i8+rVqzs6OjAdTQEsAjfgzJkzCxYssFgsrAfCL7AITIXf73/jjTeefPJJq9Wa+vqOHTvEVROrgXGFAd1LwPXw+/0bN27ctm3b8uXLr/d30L2EMBeB6+HxeDZu3Lhz584pFAIisAhMgt/vf/7553fu3FlZWcl6LBrAzHoAgEc6Ozu7uroefPBB8Y9ut7ulpaWkpITtqLgF6yKgCKyLCBEdAMqBRQAoBRYBoBRYBIBSYBEASoFFACgFFgGgFFgEgFJgEQBKgUUAKAUWAaAUWASAUmARAEqBRQAoBRYBoBRYBIBSYBEASoFFACgFFgGgFFgEgFJgEQBKgUUAKAUWAaAUWASAUmARAEqBRQAoBRYBoBRYBIBSYBEASoFFACgFFgGgFFgEgFJgEQBKgUUAKAX3umqGcDTxVV9EfD4/NBYMxWx5pso5+beVWW0WE9uxZTmwiGv8wchh39Cxrku9PWPjo8mcMYP4umncYI5T0kTxXCGeJ5jzjeVz825fmL+uprTSaWU75iwEtyPziD8Y2Xu03/NxKHohYQ0bpv8PIzbBcrNp+bJi1XTC7cgEi3jDGxh++c89X/silhGjMXH1V8es0g8rkUPjZsE8bjDFKS8yiWYRmzB3seWxb891VxRmdMCwiGARP3gDw6/s7e31RlKtSBopahNK5ufcWpE/b06eu8Imvj7Hnucszg2GYueHxryB8Nfnx04HRgfPxS1hgzF5+T3HrMKcJZl1CRYRLOKBYCj2/O7TZz8Zzb90ect0tEgomZ+zdk1pXZXdWZw7zfdp7x7a90H/4Ll4/qXLKo5ZhXK3desPbp3m+8wIWESwiDn7uwZ+v+trS8/lV0aLhKV1xY+scc56YRMMxX6/r+ejjiHbkFGemsac9MjDc763vEzxkK8AFhEsYkg4mtjWevrLw2E5hBP9+du1c9MyaQRDsZff6+loHyq6KE1x8TzBuTTNkxIsIljECm9g+Dctp3KDJG4hjOdQwWLzTx5dmPaNtWAo9tzrp/qOR+Vd8jEnPf34groqe1reHxYRLGLC/q6BnS+elVdBYXvyoW+XPX7/3Mx9Ypunb/eb5/P6pD+OFiUbG8sbVzmVvzMsIlikPi+8ffbDP18Uo7jMTUHXctWkFM8TquuLtz58q8K3hUUEi9REXAh99WE4vf+PZ8S2ttPH3w2JDidNlF9tbt5UpSSBCBYRslFVIxxNNLV0B94fERUaLRIeaLxZZYWIaOvDtz7+D/NHiwQiMiZotGu8qaU7HL3mfBfMBFikBqJCo13j4l5CrJQ2PjE/owuhKaivdvz8n26LlhNBpDQBizLOVQpF5tG/Ni2qr3YwHJK7ovDf/nFRZB4RREoHsCizXKvQrzcv4iHtutJp/fVmiJQeYFFm4VMhEYiULmBRBtnWdppbhUSuFWlb62nWg9IesChTvPReT9f+kKhQtJxHhUSuEumrD8Pb2iDSzIBFGWF/18A7/90nb2r/7O/VOFedNaJIsVIiopwxw/F3Q/u7BlgPSkvAovTjD0Ze/sPXYoLPmFXY+MT8TJfKKafSaX3sr+eJ50h5EcPOF896A8OsB6UZYFGaCUcTz/zui9wgEVE8T7j7gWK2m9rTp77a0dA4J54nEFH+JeNvWk75gxHWg9IGsCjN/OIVv/UcEVHSSLfWFqifnaCER1Y5q+uLx3OIiCw99NvXTmHLbjrAonTy0ns9wU7p97d1iflnP1zIdjyzYOvDtxbcZU4aiYhGT4y/8PZZ1iPSALAobXgDw/KOwlgZ/fKJ2zXaJm77pqqxifygY/8bau8eYj0i3oFF6SEcTfx65yl5R+HxR+dlosmBOtgspmf+bqG402ANG3a8eiYYirEeFNfAovTwi1f8eb1EREkjaWhH4Xq4KwpXr71JXiD9yytfsh4R18CiNNDm6Qt2RsQDVusS81Prb2E9ojTw9PpbCu6SWueGPx3/HRZI1wcWKcUfjPzh9R55OfSTRxdqdDl0Lb/88e1iAYU5Tu8fGMAJ0vWARUr57a5TtiEjEcXzhMYNc3jOUZgpzuLczT9eIDZktQ0Zt78eYD0iToFFimjz9A2fiIvPZXdbHk53tzfm1FXZb19RIG58J79KvvRez43+RTYCi2ZPMBRrbTsvx3I/1eDp0HTY2rgw5iQiMsdpz5/7kNBwLbBo9mx747Sc6dO4YY52t7anxmYxpcZ1v33tFOsRcQcsmiXivpz4rMtYLpXUuC58chxx3VXAotmQJbFcKlfFdTiHTQUWzYbf/emsuZ9I77FcKlfFddveQCXfZWDRjPEGhn0dYfGM1ebK0Xcsl0pdlX1OtUV87vVGkF8nA4tmzL+/eVa8JXK0SHhygx7SFKbPT3+4MGxPElFexNDSeg51EyKwaGa0efrCJ8eJKGmkmjXF/Bexphdnce5D3y4TtxkSgeTu9iDrEXEBLJoB4Wjiv946b44TEcVLSR/5cjOlsc45NpEW9Ke3+5K56bnBRdPAohnwwttnxQOi8Rxq3DBHN/lyU9Da2trc3Jz6is1ieuKReeI2Q9FFIy1sZDQ0joBF08UbGD76gdQZy3ibMRs2FVpbW5955plrX6+vdsjbDJW2ZchShUXT5ZW9veKVw5ECYcsPK1gPJ+M0NzcfOXLk2WefnfSrT39vgVjGZ6d8ZKnComnhDQz3eqVMBVdtQTZsKjQ1NW3fvj0/P3/Sr1Y6rTVrisVthviZRJb3r4NF02L76wHx5qywPfn0Xy1gPRz27Nix4z9/8cgX4VNElBcxvPbHXtYjYgksujH7uwbiZxJElDTSvffZsyFT4YZs3rz5y089mzbdO05JIkqcS756MHtFgkU35rU/9ooTUbyUHmN0dRefNNY5v0p+TUTmOL2970LWHsLCohvQ5ulLnEsSUdJI9fWlmIhSsVlMgz1viU1OcoOUtYewsGgqwtHErj9Jx6xj5dRYl4ar7XVGbrDDNN9IRMYEHTjQn5253rBoKna3B8X+WOM59FD9zdlwzHoVDQ0NTU1NU/+dR79bLh7Cmvvp5awsPYJF1yUcTRw40C8es5rmG/9mdTnrEXFKfbWj6PYcIjImqKN9KAunI1h0XXa3B8UiovEcevS7UGgqntxwi1R6FDJm4XQEiybnqolI671OM427ojBngYmydTqCRZODiWim/Gh9edZOR7BoEsLRxL7/wUQ0M+qrHVk7HcGiSWjz9JkvEGEimiFZOx3BoqsJRxN7DlwQz4gwEc2IrJ2OYNHVtHn6ciZK8TARzZTsnI5g0RVgIlJI6nTk9VzKksw6WHQFh31D8kR0/zeg0Gz40fpy8aJycz+1efpYD0cNYNEVvPbHXqk5SRllQ014JqivdpjnStPRngNZkegNiy6zv2sgdl6qI1r3zdIszJpLF99ZVyYmeucE6bBP/80fYdFl3jnULxe0In1bCfXVjngZEZE5TtlQBguLJLyB4Z7Po+JzbZ0dE5ESbBbTum+Wil0ZYuf135UBFkm0HgxaR6S+wShoVU5jnVPuRfzOoX7Ww8kssIiIKBiKdX88Ij5XLStAQatybBZTbZ3UNrXn86i+e9bBIiKil9/rkXvNNazGiig9PHb/XLFnnXXE8OoBPa+OYBGFo4mOdmkfqXyxJRt6zamDszi3almB+Hz2k4iOE4JgEbV5+mwhIxGNWYX1q0tZD0dXNKx2itNR/iWDjhOCYBHtOXBBLILInWNCyk96cVcUllTkiM86TgjKdov2dw3IKT/fWYdkhfSz4QGnmBBkvEh63fLOdova3g2KKT+JEsJElAnkhCBznN7aq8+0uqy2yBsYHvwqTkRJI91dW4ST1gxx/zcc8gmsLm+DzWqL3u4YEE9aozactGaQh5eXySewb76vw+koey0KRxMfdUi/F+fdYcFJa+awWUz31konsOdO6HDLO3stSt3gbvgmTlozy/paR6RAICLLiEF/7byz16L33h+QN7jrqnDFb2ZxVxTab5P6p37YPqizLe8stai9e0guJUJNqzpseMApFh2ZL+it6ChLLXrz/T65lAg1reqw0mUfLyUiMsep7V1dBXXZaFEwFDt3Qrqk9d5alBKphM1iWrWqRNzyvhiI+4MR1iNKG9lo0e72oGVEyuBeX4twTj0a65xRm5RW16qjPYZstOjQkUFxX8FSbkIGt5o4i3Pn3WERn/WUVpd1Fu3vGjBfEEhMnPsWVkRq8+DKUjmtTjd7DFln0d4jAzljBiIaLUwicU596qsd46UGEvcY9ukkqMsui7CvwAP3rZzYYzinkz2G7LJon3cA+wrM0d8eQ3ZZJOcrYF+BIc7iXLl0r/OoHvYYssii1HwF7CuwRWd5DFlk0V6P1Pp0tCiJxDm2pOYx7D2i+QLYbLEoHE18fiwsPt9xjw11EGyxWUxLlxWJzzqolcgWi/Z3DVhGjEQUzxPWLUejH/Y01Dl1UyuRNRZ90C/2VxgvNSCc44FKp9VSLl3Q8tHHIdbDUURWWOQPRi6ei4vP960sYTsYIPOdb5Xpox9DVlj0ztF+sYHwaJHwYA3COV6oq7KPFkn9GA56YRHfHDoyKD6UzM+pdFrZDgbIOItzq6pt4vNHHUPaPTjSv0Xt3UNy+unaNZiI+GJNTYmYnJo/bNTuwZH+Ldrr6RfTT6MFSD/ljvpqR+ImKTlVuwdHOrcoHE18dvzyMRHSTzlEBwdHOrfosG8ofxjHRFyzruZyky2N7tTp3KK29yfacN+EYyJOcVcUWsqkg6O3Dmiyc6qeLQqGYhf90jGRHDYADpEbeUd7E1qsONKzRe3dQ3I1UUMdup/yy1q3Q6w4so4Y3jmqvauU9WzRWwf6pGqiMhOOiXjGWZxbMl+qOJIP9zSEbi3yByORPqmaqHYFVkS8s3ZNqVhxZBwQNLfHoFuL5KyfqE3YgO6n3FNf7YgWaDUbSLcWyWnCJfNzUE3EPzaLSc4G8novsR3MTNGnRd7AcHQinEPWj1ZYU1MiBnWmAUFbN8Dq06K9R6VL8lAcriFWuuwjxUkiyhkzHPJqaY9BnxYd65RCAsfCXIRzWsFmMd01EdR9djysoRRvHVqUmsS94Rs4JtIS65aXajHFW4cWHfQOyUncK10I57REXZVdTvH+4KhmgjodWiTv8FRVI4lbe7jvlnK1urs0E9TpzaL27iHTgBTOralBiwXtsdptF4M6y4hmgjq9WYRwTutoMajTm0UI53SA5oI6XVmEcE4faC6o05VFCOf0geaCOl1ZhHBON2grqNOPRQjn9MRqt32iGQPvQZ0gCPqxCOGcnqirspNdM0GdfixCOKcz7q7WQFAnCIJ+5iKEc/pDQzt1OrEI4Zz+0MpOnX7mIoRzukQrO3V6sAjhnF7RSlCnB4s+/AzhnD7RSlCnB4vkytZbqqwI53SGHNSdOMFvUKd5i7yBYRqUwrn77kE4pzdqFhdOVL8avIFh1sOZHMOiRYtYj0ERiQUPLbv5B0T0NQ2e/+QXxhi/0TOYBYLJ4rj7uQpyENGxwT2Gr95gPaJJMAiCcO2rLpfL5/OpP5pZ8ONffmo4lSSivDvN//HPd2b0szT0bVENFb4nP3/py68PjhJRdC698W/VGf2smSIIQjKZ1HZE5w9G0HdO96T2qeOz+fDkFm3evFnlccyOfV0DeVGpjbAKfee08m3RGStddrH5cM6Y4cPPYFG66Tp+SbwVwlpmUqHvnFa+LTrDZjE5Fko/XHk/lis0HNEFQ7GL56RLvmqX45hIz6z9y1Jp8TEocHhNmIYtSr3kay0uD9c1dVV2+Zqwffy18J7KokgksmXLFpfL5XK5tmzZEonw9Tvg0LFBtpd8NTc3t7a2qv+56jA4ONjY2MjJjz71mrAOD3dLo6ks2rNnz4oVK3w+n9frFf+o1qhuTDiaONst/WjvvMum/gCam5tbWlrU/1x1iEQiv/rVr77//e/7fL7y8vIXXniB9YguJzFE+hLBUIztYK5iKosaGhoaGhqIyGq1rlix4siRI8x/J8kc9g1ZRoxEFM8TVi1RdVEkTtFEtGnTJjU/V02i0eilS5eWLl1KRKtXr+7o6BgcZJzGtrbaMVFDbuBtv3u666LTp0+Xl5dbrbzcjnrIO2iOExElbjKofLeK1Wrdvn17U1OTmh+qMhcvXiSim266iYgcDocgCOIrDKl0Wi1lJiIyJmj///F1g/K0LPJ4PB0dHU888USmRzN9vjg5Kj4suiOf7Uh0ycDAwNAQX7/vKSV07z8V4yoz1Ugp68hUmpubxb/h8Xi2bt363HPPlZTwkuuZWlB0nztTo5r626JvHA6H3c7d4cGqJfYxK4/lRmYiKikp2b1796Rfbm1t3bVrV1tbGz8KkVoFRVN8W3SPGMtdvHixpKRkYGDAYDCIr7Clrsq+w36GImSO0yHvYD03xxtTRXQej2fXrl0tLS1cKUREJz4Niw+OW3JRUJQJLBZLUVFRZ2cnER08eLC2tpaT/wNyAC+H9DwwlUUHDx70er21tbVcHRldkYG6ChmoGcFqtT777LO7du1yuVy9vb1PPfUU6xFJ3OeWMlMNgxxlpk5eGcEzrx7sfffVC8YEjRYJv3nGxeS8FcioXC0SjiYe+9kntiEjES1rLHl6/S2qffSkaLUy4nCHlLJgdbBJWQAMsVlMjlukzNSPPg6xHYyMxiwKhmL9PdK59b3LitkOBjBh7SopMzUykOAkM1VjFnkDw2LKwphVWFpZyHo4gAHuikIxM9UywksnBo1Z9MFRKWVBsKudsgA4odJptTqkJIaDHi7aa2nMIv+XSFkAl4P5c/4ID0kMWrKovXvIMJjxlAXAP0srpfZaeREDD0kMWrKo0z+cF5FSFtwVWBRlL3VV9tFCgYhyxgxHT7JfGmnJoo86pZ1Nx9xcFbosAJ65804pM1W+6IAhmrEoGIpFJlIW6moRzmU7NUuKxCQGIcS+E4NmLJK7LIxZ1WiaBTinrsoes/LSiUEzFh39TGqaRXYDUhZAaieGruOMgzrNWPT5RB63fN0nyHL+Yom0w9TfE2PbiUEbFrV3D1lHDEQUzxNqFmN3DhAR3ZdStMc2iUEbFnX6h8WyvDGrgHu+gIi7olCwS3eEHfKyTGLQhkVy9i7K8kAqlYu4KNrTgEXBUCwyMLHHvQx73OAy8nUSQkhgGNRpwCLscYPr4a4olPe7vYEwq2FowCLscYPrkbrffbiD2dJIAxadOIE9bnBdUve7WeV3826RHM5hjxtMytLKQuZN6ni3SM7jxh43mJS6Knu0QCAic5xY5XfzbtGnn0nfF8dc7HGDyZHzu49/wiYViGuLUm/Lky/eAOAqapYUsb1pj2uLvIHh3Ih0W16dCx1/wOTIN+3lRdn0M+HaIvl6FUORAcWt4Ho4i3PZ9jPh2iI5rUNO9ABgUuRLWc6cYtDPhF+L/MGIEJJ6ldQswaIITMWqJXaxn4mVRZM6fi1q7x7KixqIKIbEH3Aj3BXSqVHOmKHTD4smONZ1Se7HjV4lYGqu6N/dqXb/bk4tCkcTZ06xvEIcaA4531/9S8g5tcgbGJaLW1W+QhxoFHeFTbyEPDei9tKIU4tSi1uxxw2mg7ui0FDEpvSVU4suN3BEcSuYNqxKX3m0SG7gSITiVjADWLV65NGi1MQfdwW2FsB0kVs9qpwKxKNFR08OI/EHzILUVKBDx9RbGvFokZzfjsQfMFMWL5aCl8AXWRzR+YMRGhSIKGlE4g+YMTWLL19tpFpQx51F3sCwmPgTtWGPG8yYlS6pYWpexNDuUymJgTuL5I4/VocJHX/ATLFZTI65UiqQal3wubNI7vgjB7gAzAj1uwLxZZE3MCx2/BnPIXT8AbND7gqk2tKIN4vCuLkVKKSuyq5ylQRfFh3rkgLZglIzqiHArFmwUFpRq1MlwZFFqdUQ9y5FrxIwe+6ZaKOrTpUERxZ5A1IDx3iesLQS4RyYPe4KmxjUqVMlwZFFqW1QsSgCSnBXFKrZMJUji9AGFaQRuWHqyZMZv5GFF4vC0UR/jxS/yvv9AMwauWFqZCCR6SoJXiySF0VjViyKQBqQuwKpsDTixSKUiIP0Uum0ygXknd2ZTQXixSJ5UbRgoRWLIpAWVCsg58KiYCgmL4ruwYV5IE3IS6NMF5BzYVHqoggl4iBdyEujTBeQc2FR55dYFIH0Iy+NjAk6+lkGl0ZcWHTic2lHX05/AiAtLLpDWhr5v8zg0oi9Ral9s7AoAullaZUavbXYWyT3zcKiCKQddXprsbdI7puFRRFIO6m9tTK3NGJvkZzmhEURyARy64HMLY0YWxQMxSIDWBSBDFKzuDDTSyPGFmFRBDKNu6Iwo0sjg8HA2CIsikCmUWFpxNgiLIqACmRuaWQwGBjPRVgUaYLm5ubW1lbWo1BEppdGLC3Cooh/mpubW1paWI9CKRldGjGei7Ao4plIJLJlyxYi2rRpE+uxKMVZnGsozGBCHUuLTn6BRRG/WK3W7du3NzU1sR5IenBVZTChjplFwVBspH9cfMaiSHPs2LHD5XK5XC7WA5kuGU2oY2YRaoo4YXBwsLGx0XUlzc3NU/+rzZs3+3w+n8+nziCV464ojOdmamlkTu/bTR/fuVHUFPFASUnJ7t27WY8i40i1RiPS0ujh5WVpfHNmc1FqowVWYwBZhdyGIe1LIzYWpXafw6IIqIPchiEZTvPSiE1Eh0WRhtDNNp27onCXtdc6YhA71KXxpkY2c1Fq97lKJy4SB2qQ2qGu+3Q6gzo2FsmLopvnoSU3UA95aZTe5t0MLLqiJTeunQQqUlVZIDfvTuO9Rgws8gakcA73FAGVydC9Rgws8gcjuKcIMMFdURjPS/+9Rgwski9vxT1FQH3k80k5jVM5DCySL2/FPUVAfeTzyZH+8XA0kZb3VNui1MtbXfOxxw3URl4a5aVvafT/tixdZRjp+zAAAAAASUVORK5CYII=[/img] Si el coeficient del terme en [math]x^2[/math], que és [math]a[/math], és positiu, aleshores les branques de la paràbola van amunt, d'aquesta manera:[br][img]data:image/png;base64,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[/img] Si el coeficient del terme en [math]x^2[/math], que és [math]a[/math], és positiu, aleshores les branques de la paràbola van avall, d'aquesta manera:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZsAAADrCAIAAAAwr6zaAAAAAXNSR0IArs4c6QAAG81JREFUeJzt3X10VPWZB/BnZjKZmWTyIgkzJATGkND41gRQsTYrtqABg1BFsdpwhCB1zyqc09O60mN39Syewwou7Z6Ku6esCHJA1FCKokESsS0adqEiTHypAcZkeJlwY4KZzCV33u/+cYebcQjkbWbu2/fz10Sb4efx9Otz7+95fj8dz/MEAKAKeqkXAACQNEg0AFAPJBoAqAcSDQDUA4kGAOqBRAMA9UCiAYB6INEAQD2QaACgHkg0AFAPJBoAqAcSDQDUA4kGAOqBRAMA9UCiAYB6INEAQD0ypF4AqBPjDTLe4OV/fYrNYjUb0r8e0AgkGoySi+EuBiJOt4+IPm3tI6ILPSGfNyz83YwwGUK6y38rZOKjlx4MHFMsRJSdZagoz7bnZU7INyHvYIx0OJUbhqn1NOs63/9VR7/b3d91PihklokbJLZGIWykSAYv5J1jiqW8NGtqSVaZPavMbknK94NGINHgilh/pPU0e+xU32df+LrOB02czhjU6SPD+l0hoS7/68NPwLCRQiY+aOFLy7Km35BT5cipnGwd/uJBm5BokMjFcIdO9Lb837fdnqCJ0xkDg2dQfFU1fkKmxWLIzjZUlGULf3dCfqY9L/Py33K6WfGz8Kz6rTfkuxDOCOsMITIGdPro4KsKWHi/lb/xeuusm6+pcuQM+uUASDSIOXTC+9fj3x7/rI96eRM3SC0WMvEhE+mzdROKTTMqc4XMKrNnJeXNl4vhWH/Y6WY7uwOdnsDpds4Y0BmDuoxQ4v8ybKSgJTquJLP6B9fUVBYg2iAeEk3rXAy3q4X59Fgf9fIWNrEcC1j4gIUfPzHz+9flTC/LKZ+QlbYEcTGci+k/+pXvq69YrieSySWmW9RA/uzouJLMuXcW/rAiH9EGhETTLMYbPNTWu+f9Lv83kYQgi+rJb+UtNsOt0/Oml+VUOXIk339kvEGn23f0K5/zeB/fx1sufnfBBvJnR0tuyJp3e0FNZYFUiwQ5QKJpjtPt2/VR19+P+rJ8+vhHy7CR/NnRikrrzTfmVsu45HEx3P7WnsNHermuSFbfd6ItZOIjBbo7qq95sNou2/VDSiHRNKSptWfH3s7guUj8hqNQkV1TZpz7g0I5B9nlXAy372j33z7x+rsi8VWbULJV3Jrz4B22KkeOhCuE9EOiqR/rj+w6xOz7c7eRofhXUQELnznBMOdHBXOrlP1+3en2NR7uaT3aZ/g28R/QONmwpLYIj6LagURTMyHL9jd1G7tJfMCM6qk/N3r9DOu8mYXVFfmSLjCZWH/k0IneP37A9H4dii/ZAhY+c6KhbgFyTROQaOo0aJaFjRQupH/4h2sWq/o1k9Pt23WQafvkopkd6G4LG8lQoq+7D7mmckg0tblSlhlK9D+ZZ6upLJB84zI9GG9w6wHP8cN9xm6KzzX9FD2eQ1UMiaYqTa09mxvOxb8vE16WabY2Yf2RhhamScj3S7kWsPATbjQvu7cY+wbqg0RTCafbt2GnO/p1VMwy1COiQXONs/Lfu826csEkFT+AaxASTfEYb3B9Q4fnU07sycA7o0Gx/sjWDz0fHuix9urFXOsbF1043/bgD+0aeRhXPSSaggmvzN55ryv3QuzIsaieQoV0z/zxi2ba8H/RQTHe4Kv7PcdavGJ3rvAfgMd/WqKmnV/NQqIpldPt++12d8Q98JjZn8vffGfek7WTkGVDcrp9W/Z6mC/9YmEbsPDlP8RDqOIh0ZSH9Udebjzz6Z+94jxmwMJPqDSvvH8yzkcckabWns1vnTN1xl6uRQ0UKqSHFk24f6ZN6qXBKCHRFKalrfelbaczmVhnRlRPQTstf3giXpmNjvBy7S/NPdbe2JN7yMTbp1tWP3wtijUlQqIpBuuPvLin48RBVnxQ4rL5GbPxmJkELoZbv6OdPRESj7cM2FGsKRISTRmEt2Z8e1QozcJGMjj0v1ziQEdVEu0+0tXwx/OmrtiPKNaUCImmAC83njm474L41qw/l581d9yy2cUozZKO8QZf2NneddwvFmv+Ylr16GRsgyoFEk3WXAz34o529quwsKEZ1ZNuCkqzlEso1gIWftpdeLpXBiSafDW19mx5/ZyJif3IZfN31KI0SxMXw61/s/3i55f+W2KgrBsy/rmuFLvJModEkyOhP+P4B15hE0DY0Fy1FM8+6bblgGffO9+IvbhsfvTx+knYVpYzJJrsCE+a/V+GhU2AkIm3TTM/v6wcpZkknG7f2v9pF3vW8AQqc0g0eRHazcye2I/9ufw9C8fXzymWdFFax/oj6xrav265KGwXRA2UVZnxb0vLsQcqQ0g0GYnf04zqKVBEz/y8FJsAMpHwBIo9UHlCoskC64+8sLO9/XCsCggbKfumjA2PV+DRRlaEJ1DLudiP/bnRR+qK0YUrK0g06THe4HObT4kvzoQ9zZW1k6ReFwyC8Qaffe2UuAcaMvGVNXmrF10r9bogBokmMafbt/aVdsvZ2I8BG9XXYUhT7tbt7mht8sa/VvsPFNTygESTUlNrzyubz2T16enSi7O1q6ai40kRmlp7Xtl8VnitFjVQoIjWrsS/O+kh0SSTsA9gqcKLM4VJeK3GldAzK7CTIzEkmjTiH1uEdzFocVIi4dAO7ouw0K3Wnxtd8RhacKWEREs31h959jVX11G/8GqZy+bn3Y+OMwVj/ZFfbWrjnAOhVvsT27LZ+BcqDSRaWrH+yFOb2vpbY9ua/bn8isdK8J90Fbi86MYGqCSQaOnjYrgXt7X3t8XizF+EUU1V2dh4puXdC8IoLkJNKki0NHEx3DMbT4pdGtxEbGuqUPwGaNhItpvNa5aW4fVoOiHR0iE+zqJ6skzNeLoe59KoU0JXB1rV0gyJlnIuhvuX350UjjlDl4YWON2+F/6rXTgwEqGWZki01HK6fS/+vj3jAhHiTEtcDPfMSyeFVjWEWjoh0VIoYSSg4FYTjjnTDoSaJJBoqRIfZ2EjXX9nzm/qSqVeFKRVfKgRkakiY8MvEGqphURLifg4w0a+lrkYbs0fXLr2qPAjX6p/+enrEWqpg0RLPsQZxGP9kV/9Zxt3MjZUgEotpfRSL0BtEGeQwGo2bPhFheXGDOHHQFv4qZfaWH9E2lWpFRItmVwMhziDy1nNhg1PVJgqYqHW3xZ+ahNCLSXw1Jk0LoZ7bv1JoVEDcQaXEx4/A21hwu5nyqBGSw4Xw/3r706KfWeIM7ic1WxY80/l3EQiIn2E+ltRqSUfEi0JhCGnzEtTARWzcxBnMCh7XubaVVMRaqmDRBurhJnNgltN6DuDqyizWxJC7YWd7VIvSj2QaGPC+iPrt7QPjKBXZTy/rFzqRYHcJYRa++GL63Z3SL0olUCijZ5wfCN3KkyY2YQREkItWEhEZAzoWpu8CLWkQKKNUsJptJbrEGcwMmV2y5MrJvfn8nQp1N76mJF6UYqHRBull945I8YZN5HWPI4RdBix6or8FY+ViKG2q6GzqbVH6kUpGxJtNNbt7vj8Q68YZ2tXTbXnZUq9KFCkmsqCFY+VBCw8EWX16V/ZfKalrVfqRSkYEm3E3vqYEe/I6M/lcbg2jFFNZUH1veNCpliovbzltIvhpF6UUiHRRqaptWdXQ6cYZyseK0GcwditrJ1UWZMXNhIRZTL0zMaTjDco9aIUCYk2Ai6G27RlYGwTF9NBEq1edO34GaaonojIcpae23wKnbejgEQbLqGT1to7MIWOOIPken5ZuaXq0jT7l+FnX3NJux4lQqINC+uPvLhjoJP2ptkY24Tks5oNGx6vEDtvu4760aQ2Uki0YXlqU1v/lwOdtKsWTpJ6RaBOVrNh7aqpARsRUUaI0KQ2Uki0oa3b3cF+Hms90zn06KSFlCqzW1YunxzfpIZ+juFDog1h95Gu1iZvRoiIyF9Ez/4jrsiGlBM6b8UmNfRzDB8S7Wqcbt8bOzxir8aqpZPRqwHpUVNZMO2uPKFJLZOhNa+4sPU5HEi0K3Ix3L9vahd7NR6uK6quyJd6UaAhqxdda5tmFvo5+PboU5vapF6RAiDRBidsbpo9RERhI1XW5C2aaZN6UaA5zy8rt1yXQUT6CLGfh7H1OSQk2uBe2Nkubm5m35SBXg2QhNVsePrRUn8R0aWtT4yyXx0SbRBbDnjaD18UNjcDRbTh8QqpVwTaVWa3rFo6sPW5acsZ7BJcBRItUUtb7/t7vhF2AwI2WrtqKjY3QVrVFfkP1xUJuwTWXv0zG09il+BKkGjf4WK4l7adtrA6IuKy+fq6idjcBDlYNNN20+w8YZfA1EnYJbgSJNqAhN2AO2rHYXIT5GPVwknCxezYJbgKJNqAdbs6xN2A8TNMK2sx6gQyYjUbnq4b2CU4/gF2CQaBRIvZfaTr649ZcTcAVzqBDMXvEpg43dbXz2GXIAESjei7swFsfhS7ASBb1RX59ywcL84SvLijHbsE8ZBoxPoja18ZmA342SPF2A0AOaufUyzOEvR/GV63Cy/UBiDR6NnXXKZOIqKoHrMBoAzPLysPFBER6SP09cfs7iNdUq9ILrSeaFsOeJhjXOzOzRsznsRuACiBcIwamx8lImNA9/pOD16oCTSdaE63b987XWIz7dN1pXh9BkpRZrf87JFise0Wh3MItJto8a/PAhY004LyLJppm1KdLR7OgRdqpOVEi399Nu0uXIMCirR6caluip7wQu0SjSbatoOdeH0GKmA1G55dUYYXaiItJpqL4d75E4PXZ6AOCS/UNN6hprlEY/2RNa+4xGs3Fz8wAa/PQOkWzbTZbxnoUHu58YzUK5KM5hJt3a4Ovj1KRFE9TanORvcZqMOaJQMdasc/8Gr2+ihtJVpTa8+pQ7HhTd0U/erFpVKvCCA5rGbDMz8vFUc+X9p2mvEGpV6UBDSUaIw3uPX1cyYuNrz57ArcUweqUuXIuWfh+LCRiMjsoXVvaLGZQ0OJ9txrpzIZIqKQiZ9/rw2vz0B96ucUZ9+UIXxmjnFbDnikXU/6aSXRthzwsJ+Hhc+2aeb6OcXSrgcgRdYsLQ/YiIiMAd1773ZprZlDE4nmYrj33u0S7kUP2OjXj+D1GaiWPS+zvm6icB+7Bqej1J9o8e0awrSTPS9T6kUBpFBNZUH57QPTUVs/1NCzp/oTbeuHHrFdo/z2bEw7gRasXlzqLyEi0kfoo30XtNPMofJEa2nr/WjfBbRrgNZYzYbfLC/lsnkisrC6328/rZFnTzUnGuuP/H77wFV1v1ziQLsGaEeVI+eO2nHihXgaOZlDzYm2bleHeLrGHbXjqhw5Uq8IIK2WzS6mqbGTOU4dYrXw7KnaRGtp6xXHA2iqftlstGuA5ljNhufqYydzaGSQQJ2JxvojL207LY4HPFeP8QDQqDK7Zf69NmGQIJNR/yCBOhNt3a4OYTwgbCSMB4DG1c8pzr4udhl7p5NT96mQKky0+OfN7OsyMB4A8HRdqfjs+dbb51X87Km2REt43ny6Du0aAInPnusbVPvsqbZEw/MmwKDinz09n6r22VNViYbnTYCr0MKzp3oSDc+bAFenhWdP9SQanjcBhpTw7NnU2iP1ipJMJYmG502AYYp/9nz1zXMqm/dUQ6IJ85t43gQYjsSeW3XNe6oh0bZ+6BHmN8NG+tHdBXjeBLi6+GfPE4dZp9sn9YqSRs/zvNRrGBOn2yeeF2RwYH4TYFieeGCScHGUhdX9drtbNc+eyq7RWH9kw043zgsCGKkqR86suePUd86tnud55ZZpDS1M9OvY+bQzZufhvCCA4Vs2u1g3JXbW0MH9F9Tx7KngGi3+PpSgnZ6snST1igCUxGo2/HKJQzjnNqtP999/PCP1ipJAwe/RNu46Ld6HsmrpZDxvAoxUlSPne7fF7lhhvwpvO9gp9YrGSqk12u4jXV2f+YXP5bdnV1fkS7seAIVavbg0aCciygjR+43fKH00SpGJxvojb7193hjQEVHARisXTpZ6RQBKZTUbHrpvQsjEkypGoxSZaPEDT/fMH4/7NwHGYtFMm22aWfjs+ZRT9HUEyks0p9t34vDAwNOjs4qkXhGA4q28f7I4GqXoq/AUlmisP/Lb7bEGtP5c/okHsL8JkATxo1GmTlJue5rCEq2hhYm4Yw1os+biwjqApFlcbTc4FN+epqREY7zBvY2xBrRAEWHgCSCJ1NGepqREW/dGR+6FWAPaYw9NRAMaQHLFt6f5ToSUeHK3YhKtpa2308kJnydUmmsqC6RdD4AqrVw4OVRIRGQM6N56+7zitgiUkWisP7LpzbPiCWi/fgQnoAGkhD0v857548XT015uVNizpzISraGF4U/HNgTm32tDAxpA6jw6q0h/aYL96F+9ytoiUECiMd7ge+92CQ1oOod+cbVd6hUBqNyvHlHqFoECEm3dGx3iRPrjPy3BhgBAqlU5cqbNyhMn2BW0RSD3REvYEMBEOkB6rFo4SdgiyAiRgrYIZJ1o2BAAkIrVbFDiFoGsE62hhYmcxYYAgDQStghcDCf1ioYm30RjvMHm5m5xQgAbAgDpF79FsHHXaamXMzT5JtrGvWeEI4MwIQAgFWGKQPh8/gu//O9gl2miCUcGCZ/tN2BCAEAyKxdO7hsXO2hoc4Pc72CXaaKJd9b15/L1CzCRDiAZe17mgtqBg4YaWhipV3Q1cky03Ue6xDvrbr4Td9YBSCz+oKG9jV1yvotAdokm3CEgbAiECnFnHYD0rGZD3YKigIUnotwL+o175dvJIbtE2/qhJ/4OAWwIAMhBTWWB/YbYXQQnDrOyHfaUV6Ix3uBfmnuEEU6DQ487BADko35BcX8uT0QWVr7DnvJKtPUNcSOcD5ZIvRwAGFDlyJlenSeeBynPTg4ZJZrT7fN8ihFOAPlaPrdYPA9Snp0cMkq0DTvdwghnfy6/8n5cKgwgO/a8zJqaQjl3csgl0RI6NsrsFqlXBACDWFxtN5TIt5NDFonG+iNv7kXHBoACWM2GuvsGOjle3S+vmz1lkWgNLYypkwgdGwBKEN/JcaxFXsd2S59owi2csY6NEnRsACiA2MmR1afb+q6MyjTpE+3V/R6rN9axUXcf4gxAAaocORW3DJzJ0dLWK+16RBInmovhjrV4hQItt9yIMzYAlCL+TI5Nu85KvZwYiRPt5T1nsvp0RMRl8088gA0BAMWw52XOnlMgNNxG3FGZ3K4iZaI53T7xVpSJ08w4YwNAWZbNLg7aieR0u4qUiSa21LL50dWLcSsKgMJYzYbaeQO3q8ih4VayRGtq7RFbam+9Ix+3ogAo0aOzisSG2+bmbskbbqVJNNYf2bGnEy21ACogNtxmdNPWAxJ3ckiTaLuPdAnX1oWNVFNTiJZaAOWqqSzILTfSpUvwpC3TJEg01h95v/GbWIFmw7V1AIr3xAOThDItq0+3vqFDwpVIkGgNLUxGNxFR2Eg/XTgBBRqA0lU5copmxOaizjo5Ceei0p1o35l5cugXzbSleQEAkApL7x444VbCuah0J9p3Zp4WYOYJQCWEE26FzxLORaU10RhvUJx5wr3CACqzfG6xOBf1hz9JMxeV1kRb39AhzDwFLLhXGEBtvjMX1RGR5CKC9CWa0+0781ls5qloBmaeAFRo2eyBiwh27OlM/wLSl2ivvd8pFGj9ufzSu1GgAaiQ1WyoqSmMlWlnJRhfT1OixQ+lT6/OQ4EGoFaLq+3i+Pqbe9M9vp6mRNv6rke852n5XBRoAKoVP75uTPv4ejoSram15/wXfiKK6ml6dR6G0gHUbdFMmzC+nhGi5ubudJZp6Ui07Y2d4qlBKNAAVE+4L0oo0zK601qmpTzRmlp7Ih0RIorq6bZqnBoEoAk1lQUGhwSnDKU80Xbs6TQGdIRTgwA0pm6BBKcMpTbRmlp7hFODonqcGgSgLTWVBcbJBiLSR+hwS296yrTUJlr8sY44NQhAa5bUxso0q1efnjIthYkmFmg41hFAm+IPg0xPmZaqRGP9kc0N53CsI4DGiYdB5l7Qv7o/5WVaqhJt95EuI0NEFDbS/JrxKNAAtKnKkWO/IXYY5LGWlJ/ZnZJEY/2R95oHzt3GsY4AWla/oFg8szvVZVpKEg0FGgCI0lmmJT/R4gs0QwnO3QYAql8QO7M71WVa8hMtvkCru68IBRoAVDlySr6fjjItyYmWUKDh3G0AEIhXq6S0TEtyoiUUaMn9cgBQrvSUaclMNBRoAHAVaSjTkploKNAA4CrSUKYlLdFQoAHAkFJdpiUt0VCgAcCQUl2mJSfRUKABwDCltExLTqKhQAOAYUppmZaEREOBBgAjkroyLQmJhgINAEakypFTPDUlZdpYEy3hmI0ffi8/CYsCALVL0YEcY020ptYeHLMBACOVogM5xppob7/fhXPQAGAU4su0ZN1CMKZEi79JAAUaAIxIfJmWrFsIxpRoA1c9oUADgJETy7RkXRY1+kSLv4tz3o9x1RMAjFiVIye5l0WNPtF27MVdnAAwVg/cZRfLtMZPusf4baNMtKbWnuC5COGydAAYm/ir15ubu1l/ZCzfNspE297YaeJ0hAINAMZsSW1R2EhElNFNDS3MWL5qNInmdPtCp2MF2rTbclGgAcBY1FQWGEr0RKSP0Pt/GVOZNppE2/quRyjQ2PzosjnFo/6zAQAEdffFyjQjQ7uPdI36e/Q6nW5Ev+B0+85/4Rc+33pbvj0vc9R/NgCAoKayIGQjIsoI0XvN34y6TBtxjbatOfYGrT+XXz4XBRoAJMf8mvFimXboRO/ovkSv0+mGX6Y53b4zn3HC5+nVeSjQACBZFs20iWXajj2do/uSkdVojYd7svpiBdpDd2KLEwCSxmo2zPtxYVRPRBT2RJpae0bxJSN4j8Z4g8davMLnku+by+yWUfx5AABXsrjaHiokIjIGdNsbR1OmjaBGe3W/RyjQuGx+6d14gwYASWY1G6rvvEYo00KnIy1tI36bNtxEY7zBvx2OfXvRdeYqR85I/yQAgCEtrraz+VEiMnG6XR+MuNt2uInW0MJYvXoiClj4xXfjDRoApIQ9L/PW22JHYXv+7ne6fSP69WElGuuPHDr4rT5CRGScbKiuwNHbAJAqy+fG7lWxXNRtax7Z27RhJdruI10Z3UREYSMtqcXdKACQQva8zIpbsoXPZz7jRnTE0LAS7b3mb4QCDZfXAUAaPDjLPrrr74ZOtPi7UX4yDwfVAkDKxV9/d/R/R3AS5NCJFn/0Ngo0AEiPgXtVfPrhHzE0RKI1tfYEz8cODsLR2wCQNlWOHPEkyEMHvx3m7PoQibbvo27x4CCc7AgA6bSktihk4olIf2G4RwxdLdGcbp/n77GDg26rzkeBBgDpVFNZkFFsoEtHDA3nV66WaNuaOy0XY3PpONkRANJvzo8KxCOGhjO7fsVEY7xB8eCgiluycXAQAKTfopm2cCGRcMTQ3qG7ba+YaOJcen8u/+AsvEEDAAlYzYa5c2JHDAXPDT27Pniixc+lF0/FXDoASKb2lsLhz64PnmiNn3RjLh0A5CB+dv3ciSFm1/8fiqPq3xf2lrEAAAAASUVORK5CYII=[/img] Si el coeficient del terme en [math]x^2[/math], que és [math]a[/math], és negatiu, aleshores les branques de la paràbola van amunt, d'aquesta manera:[br][br][br][img]data:image/png;base64,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[/img]

Information: Sobre la funció quadràtica (2)