Mathematics
Grade10
Easy
Question
Determine the solutions of the quadratic equation
by inspecting the graph. Give answers correct to 1 decimal place where appropriate.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAO4AAADrCAYAAABuI6qRAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAC5jSURBVHhe7Z35k1RVlsfnf5qYv6JjfhljuqdjtO127HG0Gw01emhtV6TBpW03BKHbQFtpZkAQUEoQ2WQpNsECKQuqWKpYZd93vPM+l7z46ubJzHNqSOslnG/EF16+c/PmWe73vqVuvvyHU6dOhTuJp0+fjpRsVWH08cwZ0aZl1eMkvv9vjLAT6tkODhPu8ePHnaPNEyfC8SNHwoljx25sS21a8ETxvmPF+yHbUpvR5gn+L+IcaYx3IstavSlcDPv27YuFbsWTJ0+GgwcP3hwYrUi7Q4cOibac9H348OFwpCgq21KbMvEbX/hfspdJnHv37g27d++O21KbnPitjfPo0aOxvcZvSJy8p9z+5NmzYXDFirDh97+PAzvZUpypHSSGZGf7THEE4zX/f/LJJ5Fsl9/TiNoc0j8+47tkz0l7csJ74r7i9cnCp80TJ4adM2fGeMvtLWOFmKklNdXU0zJW8JsxSJwpx61oGSu0wxdt32gTv4kTDhMunWhx/vz58P3339deNcf169fDhQsXaq9a4+LFi+HatWu1V62BL1oQJwXRAr9/7DgvHjgQVv385+FyMdjLaBUndUyYP39+pBaWHOIzvmtBTsjNTRT5XHvffeFYd3dtxw8g15YcUktqqsWPGmcTEKfFF7TZULgoW4tz586pxXX16lWTkyTgypUrtVfNQaLwRSsuZrrvvvuu9qo18PvHjvN6sW/9b34TjpQGNvERZwK1ev7558PWrVuj7b333gtjx44Ns2fPjvZPP/00HnG1sOQQny3iIifkJuH80FDovv/+cKE44uQg15YcUktqqkHKoVZc/984m4E4y/VsBertwq24cMHW8ePDwPTptVfDhcv2vHnzwl133RW2bdsW+vr6wssvvxw/HzFzerd48eLKCvcwlwIPPxyuC3l14cpw4XaIcHd98EHoee652qt64cJp06aFnp6esHz58vDuu+9G21tvvRW2b98elixZUlnhMiFtKyYmCS5cGS7cDhHusQ0b4unytUuX4us06MqYNGlSFO6Gou2UKVPiPo683LCpsnC3PPVUGJwzp/ZqOFy4Mly4HSLcy0UtVt9zTzg/OBhfS8J97bXXwrp168LZs2fDH//4x/DOO++EV155JfrR1dVVSeFev3w5rPnlL8PJ4hRfggtXhgu3Q4RbBBQ2PvZYOFgcOW+8rBcufyJIfwngTwsLFiy4WUNEW0Xhniqux7sfeCBOTBJcuDJcuJ0i3ALbiyNq7xtvxG1JuM1QVeEOFZPLpscfjxOTBBeuDBduBwk3DvLf/e7mILcUunLCreWwt5iMvn3zzbgtwYUro6lwLQswLAmwFoM/emsTkIqhBXFaFmDg92jFeaa/P6y9//5w5fTp+NoS50iEqwU+WxYmxBzWJgX+DHR4+fK4LYFcW3JoXYBBnNoJaiRxaif5dMDRoukCDK6T6ExDZjmW00m2nCwCp3/JJjE5KNly4gO+cINGspdJYrkuZIkc21KbnPgyKnEW/p0pZtnVv/pVOLRxYzhXDCDiFNtmvHz5clyIAdmW2uTU5hCm8SLZJNL2bBHPySL3q+6+OxwtrnPPF/FIbcm1tm9qSC2pqaaexGcZtyOJkzEg2XKmcSvZJKalmvgEhwkXMhNoSBI4lZBsOdPgkWwSaXvp0iXRlpNZEV+Y6SR7TmZo1pRKNon4MlpxcmT4+tlnw+4ZM+IR62xRbKldTt7HjSrIttQmpyWH+GyNk/+/W706/onranH6STx5O0iuLX1TS2oq2XISH3EyZiR7zpHEyRiQbDmJE18km8SkT1G4fo1bD/wezTgH3nvv5kIMjsJaVO0aF+wqxdII5NqSQ7/GdeGKwO/RjPPounVh/W9/G49SnF5qUSnhFm2RSk9x9rD3f//3xs4GcOHKcOF2mHCvFLVhwcKZ3bvDBeWgAFUS7oXi9PFy0T/fCDrV21vbK8OFK8OF22HCBZseeyzs6+oKl5QxgioJ92JRo2M9PaH7P/8zXCmu05vBhSvDhduBwt0xeXLY9tJL4caqZR2qJFwiHJg5M2x+4okbO5rAhSvDhduBwj20dGlYP2ZMvKusRZWEe6mo0ZZx48JA7RtMzeDCleHC7UDhXjh0KKy+995wZMeO2p7WqJJwzxbja1VxfXv8q69qexrDhSvDhduBwgXrHnww7Fm0qPaqNaok3KO9veHLe+4JlxUr81y4MpoK1/rMKW0CcNKSAOuSR0uhidOy5BG/qxDnt6+/Hr75859rr1qDR9dALSw5xGfLUsC9c+eGTf/93xSrtqcxyLUlh9Ylj8SpnaCsceK3dpInTkvOmy555El8OMtM04y0YWkXK0ske06Cp71ky0nfLAcjCRpfWKlC3/wv2cukPx7rcuDAgZhgqU3OkcSp8Rtq47xaDLShhQvjde6VIk4W7EvtEhmYPNoGsi21yckY0OYQn/FdspdJW3zdOnFi6J00KTCkpXZlkmvtWKGG1JKaanJuHSspTk3fkL4ZA5ItZ4pT0zdt0gQlCpflY3wwDrcih26WbEm2nLSjvWSTyOxCUJItJ6cb9M3sJdnLJFn79+8Pg4ODsXhSm5yWOCmyNc4k3ma8WAzQEwMDYfUvfxmO794dLhbFlNolMpvPmTMnMh3BWpH6a3II8RnfJdswFvk+V9Rx7QMPhAMrV8abVGK7Ei1jhRpSS2pKbaU2ZRIffTNmJHtOxqAqzhotY8WqCbTZULh0pIXlWoEZw3JagKO8R4N03aIF10OWU2X81sbJEcAaJzOqFt3/9V/huy+/rL1qjpFc42qBz/iuwbm9e8Mq5fUtsJ5CUkvtNS4gTsupsjZOgN/acUuclpyjzVsmXO35/EiEqx3QKQHaYnTqzSnw9SuvhG9rX6xvharcnNo3f37ofvTRm1/rawXr5Oc3p1y4Iqok3P5CBBuK69zvFQOvKsLdXlzffq2cbIALV4YLt4OFe2Tnzrje99y+fbU9jVEF4fJguPUPPRSGiutbXc8u3EZw4XaocInu/KVL8QkS6QFyzVAF4Z4uJppuvlhw+HD8dpAGLlwZLtxOFW4RH18y6J82LWx78cXa3saognD3zJwZep55Jt4Fv6YUiwtXhgu3g4V7sSDfz+VbNulB6Y1QBeHy4HPES4SWAe3CrYcLt4OFy6kyD45b+x//0fJ7raMt3OhncZrMA+/4O7QLdzhcuHeQcFOhNz/5ZNjT4kkSoy3coxs2hHUPPMAIjQsxXLjDcUuFyyoRLXBSmwCctCSA1VvaBFAMS6GJsxPXKoMU59DHH4evxo6N240w2muV+956K/TW1laTE+3kR64tOfS1ysVOllXRmYa0Z9mWZMuZlgJKNom0ZbmZZMuJD/jC7CXZyySxackj21KbnPhShTiJjzg5eh3Zti2s5m5tEQuv87YsBfzoo48i2c7tErU5hPjcMM4ir+eKPKwbMybsWbgwPraGvsmN2D5jWgoo2XJSw7TkUVPPlENtPZvGKZC2ljjxRbJJbLrkMX3JQEOCYn2oZMvJrEVAkk0iQaWjUSsyMPGF0xrJXiazIadWPKOWbalNTvyuQpzER5ws2r9axLzuoYfCgWXLbrzO2jKbpy8ZsJ3bJWpzCPEZ3yUb/pxiXfUvfhEuFOOJu8nkRBsnudbmkBpSS2qqqWfKIWNGsudsGqdAa5yxnoJNItpsKFxmDC2YvSynkMwaWjB74qwG5Ws/DYjTeo1bhThBOc6+SZNC76uv1l7VYyTXuFrgM743wuDs2WHz739fe3Ujh+RGA+spJLWkploQp+VUuVmcOaxxWnKONm+ZcLVOkgDrgGZ21CAlQFuM2+HmFDiybl1Y++tfh+sN3j+aN6d4thR/BkogJ9oJyjr5UUu/q+zCrQN+V1G4V4vTMv7ccqKnp7ZnOEZLuJeKcRQfJ1ucLidYB7Qlhy5cF64I/K6icAG/CtDf4AFsoyVcHmzH9XfRWW2PC1eCC/cOFu7BL76Iv3JQFknCaAm3Z9y40P+Xv9Re3YB1QFty6MJ14YrA76oK91IRC0/FOLNzZ23PDxgN4abVUie3bavtuQHrgLbk0IXrwhWB31UVLtjyhz+EXe+/X3v1A0ZDuDydg3XU+feFrQPakkMXrgtXBH5XWbgHFi2KP12ZYzSEu3X8+ND39tu1Vz/AOqAtOXThjkC42gSMZEBrE9BoQDfCSISrjdM66CzCBVKc8XT53nvrTpdHIlwtpAHNbwKt+dWvwknhLjc50U5+5NqSQ4twAXFqJyjGYLuEmw44WjQVLgkgwRqySoQVKJItJ+1YgSLZJBIQK1AkW04GUVppI9nLJFmsbWX5GNtSm5z4rY2T1TDWOHmPZMtJfMSZ72cIbi5Ol/unT4/PdYr7iv/nz58fyXb+HonaHEJ8xvf0mmnt0PLlYS1fNxT6ICfaOC1jhRpSS2qqqWfKIWNGsudkDJbjbEXLWKGdVM9GRJsNhUsSmGGYOZqRNrTHUcmeEwdpL9ly0jezC8vBNL6QWPrmf8leJoXYt29f2Lt3bxxIUpucI4lT4ze0xknx8v38Et5gV1d8BOqFIr74W7TFvrRWme38PRLpW5NDfMVnfE/7+GbwpmLy6J0yJfqTtycn5Ka8vxHJtXasUENqSU2prdSmTMtYKcepredI4tT0TRuWdtJeFC5OakHwzAQaMNPhgBY4qj2FZGDii/b0hwF6O13jAu7msujhxNattT0/7jXupaNH49pkHlUjgZyQGw3ItSWHfo3rwhWB31UXLuBxNr2vv1579eMKd2jevLDxkUdqr+phHdCWHLpwXbgi8LsThHt8y5Z41L1WG2g/pnA3Pvpo/I5wI1gHtCWHLlwXrgj87gThXi8+m1/0O7h4cXz9Ywn3dF9fWH333fHudiNYB7Qlhy5cF64I/O4E4YLdf/972PS738XtTxcu/FGEyy8rbJs4MW43gnVAW3LownXhisDvThHuxSNHwqp///dw5eDB0PXFF20V7qWCV4v38DfkE19/XbPIsA5oSw5duC5cEfjdKcIFA6+9FganTQufLV8ePjE8c8qSQ3zG630LFsSfRCneeMPQANYBbcmhC9eFKwK/O0G4O3fuDF2LFoWuv/wlbPr1r8PHM2aEhbXrXQ0sObxa5Jy/GfPzIvsVk4N1QFty6MJ14YrA76oLlz6eeuqp8Kc//zle237zhz+E13/2s9C1bFmtRWtYckirvcWp+JriNJnT5VawDmhLDl24xU5WimjBqhULWOKlBQnTDiJg8YXHXGoLDSx+g9GIk6cc3nfffWHKlClh1bp14fzmzWHaP/1TWGUQrrWe6x55JAz9/e+1V83RzhxSS8tjhS1xUhvtxAqscVp8QZsNhTswMBCXPfLT/K24Z8+emz/j34oMLJamSTaJtOU9ki0nS8HwRet3X19f6O3tFW0S8aUKcRIfcZb3EXsauN3d3bF+Y598MvRs3Rq+fuyxsH369HC4sJff04jqHBb97Smun5f99KdhaMcOuU1GS5zk2pJDaklNJVvOlEPyJtlztrOexJnXsxHxm9o2FO7Q0FA8JDMQWpEPToOmFXm0JMmSbBJxlIXjki0nfuOL1u/du3eH/v5+0SaxLI5WbGecxEec+T5mYuL5ojh1BRMmTAhfbd8e9nZ1haWFuI4VhS+/pxHVOTxzJqwqrm1Zl3zq7Fm5TUZyQm4kW05ybckhsVNTyZYz5ZAxI9lzpi+kSDaJ1jjzejYifqPNhsLlfy1Y1K0FpxyW0wJOObTXIcDiC4kguVpYT61GI05imjhxYhg/fnyYNm1avH5aWhwVX//HfwxHFiyotWoObQ5PbNgQVv785+FsMai1ICftuvRJQtHCMlaojeX01xqnxZeyRqHfnGoB/K76zSlAHniqf8LCpUvDX4vT5q/uvz8+ebEVNDn8vsgDd5J3fvhh0N2CuQHrTRtLDv3mlAtXBH53gnBzcHf5s+L0uf/ll8M3BVtBk8O9s2bFH/K6XPjNb95qYR3Qlhy6cF24IvC7E4XLqqmuJUvCtaK2K3/2s3Bs48aaRUarHF4ort9W/uu/xlVStGrngLbk0IXrwhWB350q3LRyanDOnLDq7rvj42UaoVUON3KXuvaTJ1eKOF249bDGaamnC/dOEm5prTK/Dg8boVkOd06bFn9MO31lsN0D2pJDF64LVwR+3w7CTQ9z65s8ubZnOBrlcF/Rx4p/+Zdwdvfu2h4XbiNY47TU04V7hwoXnN+/P6z86U/DzqlTa3t+gJTD/QsXhmX//M/h2KZNtT034MKVYY3TUk8X7h0sXHBuz56w+p574u8Olb/8zg9QJ1wvtvumTAkr77orHF2/vrb3B7hwZVjjvGXChQSnIU+pw0nJlpMEJHFpSAL4w7dky0kC8IViSPac/MGeZWSSTSJ+j3acxAaJU7LnBAsWLIgEue1ikQMe6cp3d/nRsFO9veHE4GA4PTAQ9vzP/4Q1xfXsut/8Jpzu74/ty++H+Izv+f5GJCfkRrLlJNeWHFJLairZcqYcMmYke852x6mtJ0z6FIXLki1mGBxoRoKhPY+ilOw502NLJVtO+mZ2wSe2pTZlEjx9879kL5OVKuXHs0ptclriTAvBNX5D4uQ9rdpjJz6OLJI9JwO0/HjW3H6hGFwXi4Gzb+XKsPnpp8Pa++8PK//t38La4hp409ixYXdxpOYxr5eK9+a+8Rqf8b28vxFpT054j2TPaRkr1JBapsezSm3KtIwV/GYMEmeeg0a0jJUUp6Zv2qBN2ie9+hG3BfG7CnHeqiNuuU3C1cKPkwcO1P25SHof9COuTGuc2nrCpE9RuMwuWuAkCdAAJ0mAFn6NWw/iI04tGl3jNsJ5w/pgfPZr3HpY47TUE226cF24dbDk0IUrwxqnpZ4uXBeuCEsOXbgyrHFa6unCdeGKsOTQhSvDGqelni5cF64ISw5duDKscVrq6cJ14Yqw5NCFK8Map6WeLlwXrghLDl24MqxxWurpwnXhirDk0IUrwxqnpZ5NhWt5dg9OahOAk5YEsApGmwCKYSk0cfIQMC3wuwpxAkucn376aaQWlr7x2fK8JHKinfzItSWH1JKaakGc2gmq3XFaco42GwqX2YvVIiwla0U6wlHJlhMH+QzJlpPPT8vjJHtOEosvki0nffPUPh6hqY0Tv61xavtuV5wMuLlz50ayLbXJSd98hmTLic/4LtlykgtyQm4ke05ybRkr1JKaanM+kjgtY8USp2Xcos2GwmX5GEFpyKEbJyVbThKQEqYh/rAcTLLlxAf6JhGSvUySwJpP1rayLbXJSd9ViJP4yLlky5kLV2qTk741OYT4jO+STSI5ITeSLWeqp2TLSQ2pJTXV1DOJRVvPdseprSdEmw2FywdrwQf7qfJw+KmyDHLip8rDcUtPlZkBtGBm0TpJAixOkgC/OTUcxEecWvjNqXqkHGon4o65OeXCrQd+u3CHw4UrwxqnpZ4uXBeuCEsOXbgyrHFa6unCdeGKsOTQhSvDGqelni5cF64ISw5duDKscVrq6cJ14Yqw5NCFK8Map6WeLlwXrghLDl24MqxxWurpwnXhirDk0IUrwxqnpZ4uXBeuCEsOXbgyrHFa6tlUuKz5xFEcaEXa84hJyZaz/ChKDXESnyRbTpal0TdJkOxlsgqm/HhWqU1OS5ysa7XGyXskW07iY4BKtpwMzPLjWaU2Oelbk0OIz/gu2SSSE22clrFCDcuPZ5XalEl89M2Ykew5GYPWONuliaaPZ6V4FFpDPpgZSbLlZJE0yZJsEkkwRZFsOZnh8IUZTLLnZIkcE5Rkk4jfVYiT+IhTsuUE8+fPjwRSm5yWHOIzvks2ieSE3Ei2nOTakkNqSU0lW86UQ8aMZM/Z7ji19YRos6FwmV20ICASoUE7TyEJCl/8VHk4/FS5HrftqbILtx747cIdDheuDGuclnq6cF24Iiw5dOHKsMZpqacL14UrwpJDF64Ma5yWerpwXbgiLDl04cqwxmmppwvXhSvCkkMXrgxrnJZ6unBduCIsOXThyrDGaamnC9eFK8KSQxeuDGuclno2Fa4/c6oe+F2FOIElTn/mlAzi1E5Q7Y7TkvOmz5ziB4JxlpmmFVnCxsoSyZaT4FklItly8vm0JQmSPScrVfBFsuWkb56Wd+DAAXWc+GKN09J3O+Jk8MybNy+SbalNTvrmMyRbTny21pPcSPac5NrSN7WkptqcjyROSz0tcVrGLdpsKFzrWmWWeEm2nATEoV6y5eTzact7JHtOTjfwRbLlJKk8h3dwcDBuS21y4os1Tm0O2xUnxU5rldmW2uSkbz5DsuVsZz3JtbZvakgtqam2niOJsx31JE5tPfl8tEl7Ubh+qlwP/PZT5eHAZ3zXgpxYTiEtOfRT5WInM4YWzFpaJ0mAxUkSwJFCAxKAL9pi+M0pGZYc4rNFXOREO0GRa0sO/eaUC1cEfrtwh8OFK8Map6WeLlwXrghLDl24MqxxWurpwnXhirDk0IUrwxqnpZ4uXBeuCEsOXbgyrHFa6unCdeGKsOTQhSvDGqelni5cF64ISw5duDKscVrq2VS4Jw3CPX+eBOgG9LVrV4sE6Itx8eKFIgHaAc3fw0iAbtAdP34sHDmiFy5+VyFO4rsRpw5W4VpyiM/4rgU5ITcakGtLDqklNdXhRg4ZMxq0O05LPdFmQ+GeO3uq1qw1rl7R/2GahF27eqm23RrXr13m3xsvFLD4cvbMyXDqhLbQhRgNflcpzkVdn0RqYavn9ZrvOtzIiW5SAJYcUktqqkWV4rT4gjbrhHvmzOlw/MTJ8NSbK8ND45eER15c1pK/nbAkPPziUtGW8+GJS8OYCV+INom05T2SLSc+WHx5aPzi8NALi0WbxOhLheKUbBLvfWJupGSTWKV6WvqmltRUsuVMOey0eqJJtIlG0epN4Z4+jZpPhGXd/WHFxqGw5utDYW3P4fDlV/vC6i0Hw+YdJ8P6bUfi68TP1wwUbQeH7WvE5RsGw5K1u0SbxC+6d4Vl6/eKtpz4iy8rN8n2nJ992Vf4szds2XEqbOw9JrYpE7+rECfxEadkg91bDxd1OhXWFrXj9WvT5kfm7RrRkkN8xnfJJpGckBvJlpNca3PI2MTn1ZsPFPF/J7YpM+WQMSPZc7Y7zryexLB6y4G4vW7bd1F3a74+GP1Fm2gUrd4ULuQwfPH86dqBubgwv/TD+femDWvDiWOHa69quK4/hYj4XnstB3TXCTdh9KWvtyd0r1kZ+ndsr+1pApPfBUYpzksXzoQN61bfbPP5ok8i1bDW0+J723J4vYh5VVi18otw8ng2PhuhSnFmvly9XFzb1/o4c+pY2Lh+TbF149QbbTa8xuVrRtyle/DBB8P7778f3/Duu++GN954I7zwwgvxmxgJ3BHrxLvKxDdmzJjw17/+NSxbtqy2tzHwu+p3lVmA/tJLL8U6vfbaa9Hfrq6u2/6u8tKlS8PDDz8cPvjgg9DX11fb2xhVvqvc3d0d7rrrrjAwMBC1OGHChFjPyZMnR38bfskAA98RJAHPPPNMmDVrVnSEbTB37twwc+bMuA340E4U7qpVq8K9994bJk2aFL755pva3sbA76oLd8WKFTEe8OKLL4Y9e/aEzz///LYX7ptvvhmFyySs+ZNQVYXLNvV65JFH4s+psP23v/0t2p5//vn4tcX0NcBhwuVIy870dTcGAsLly7vM5IAZnAQl8KGdIlz83LJlS/jqq69iEhAsvznz6KOPtiw4flchzmbC5et7nBmBt956K2zfvj0sWbLkthfuzp07w65du8KiRYvCxIkTa3sbo6rCTeAIy7jkIMl3qcErr7wS+vv7Y1tRuIiWwzRYuHBh+PDDD6PjTz/9dNzH6QhPVEigo04RLn3NmDEjxrBy5crQ09MT9z/22GPxx5SaAb+rLtz169eHV199NW6PGzcuxnQnHHEZp0y8nCU+99xztb2NUXXhcrbERLR69eowderUuA/9cQDlC/oNT5XTl4a59pszZ07cZjZ/8sknw8svvxzbJPChnSLcMkgMyeAS4OOPP67tbQz8rrpwucR55513whNPPBEnJ8Cgvt2Fu3jx4jg2OZ1Mk3EzVF24U6ZMiWcRfObrr78e65l02HTlFAR0WnaA5/owOMrgQztRuLQnTmLSAL+rLlxAXFwGJCDa2124gEe6cETSoOrC5fOSb/RTHqN3/FpliqwtNMDvThBujjtFuIxZxq8GVRduM9zxwvUvGciw5LBKwvUvGRQ7SQBB0WkrcrFMYJItJ4/D5Ha2ZMuZhMipuWTPSaLwRbLlpG9uwqUftpba5MRva5zavtsVJwM0/bA121KbnPTNZ0i2nPiM75ItJ7kgJ+RGsuck15axUv5ha6lNzpHEaRkrljgt4xZtNhQudyOZNXC2FemID5ZsOdOfmyRbTj6ftrxHsuckWfgi2XIye/J3Mm65sy21yYkv1ji1OWxXnAye2bNnR7IttclJ33yGZMvZznqSa23f1JBaUlNtPUcSZzvqSZzaevL5aJP+ReGW7xq3Ap0xE2jArGE55fDHs8qwxOmPZ5VBnNpLgnbHacl5w5VT7PRr3HrgdxXiJD7i1MKvceuRcqidiNsdp6WefnPKhSvCkkMXrgxrnJZ6unBduCIsOXThyrDGaamnC9eFK8KSQxeuDGuclnq6cF24Iiw5dOHKsMZpqacL14UrwpJDF64Ma5yWerpwXbgiLDl04cqwxmmppwvXhSvCkkMXrgxrnJZ6NhWuL8CoB35XIU5gidMXYMggTu0E1e44LTlvugCDn+THUQ2ZAZgxJFtO2vHBkk0i/rAkTLLlJHh8IWmSvUyW//FVqaGhobgttcmJ39o4WUpnjZP3SLacxEecki0nA5PvcUK2pTY5tTmE+Izvkk0iOdHGaRkr1JBaUlNNPVMOGTOSPSdj0BqnRRPaekK02VC4zF6cHpCEZqRNCkiy5yRhrOGUbDnpm4SRXI0vLATHF/6X7GUyg7Ione+tsi21yYnf1jg1fsORxCnZciJWHhIA2Zba5NTmEF/xGd8le07akxNyI9lzkmvtWKGG1JKaauppGSvlOLX1tMaJL5q+aZPOLHgP9FPlFsBvP1UeDnzGdy3IiZ8qD8ctPVXm0K0Fh3qtkyTA4iQJYJbRgATgi7YYfnNKhiWH+GwRFznRTlDk2pJDvznlwhWB3y7c4XDhyrDGaamnC9eFK8KSQxeuDGuclnq6cF24Iiw5dOHKsMZpqacL14UrwpJDF64Ma5yWerpwXbgiLDl04cqwxmmppwvXhSvCkkMXrgxrnJZ6unBduCIsOXThyrDGaalnU+FCgtOQJWw4KdlykoA0MDQkAawYkWw5SQC+UAzJnpOHobN8TLJJxO8qxEl8xCnZcoIFCxZEAqlNTksO8RnfJZtEckJuJFtOcm3JIbWkppItZ8ohY0ay52x3nNp6wqRPUbg8ApIP15BZjuVgki0nS8HoX7JJTA5Ktpz4gC8kQbKXSRHS41nZltrkxJcqxEl8xCnZcjLg2vl41jReJJtE2pIbyZaTXGv7pobp8ayaeqYcauvZ7ji19YRNH8/qp8r1wO8qxEl8xKmFnyrXI+WQMaNBu+O01NOvcV24Iiw5dOHKsMZpqacL14UrwpJDF64Ma5yWerpwXbgiLDl04cqwxmmppwvXhSvCkkMXrgxrnJZ6unBduCIsOXThyrDGaamnC9eFK8KSQxeuDGuclnq6cF24Iiw5dOHKsMZpqacL14UrwpJDF64Ma5yWejYVrj9zqh74XYU4gSVOf+aUDOLUTlDtjtOS86bPnGL2YokcT8FrRtrQEY5K9pw4yGdItpz0nZaNaXwhsfjC/5K9TGZQlo6xRI5tqU1O/LbGqfEbjiROyZaTgTl37txItqU2ObU5xFd8xnfJnpP25ITcSPac5Fo7VqghtaSmmnpaxko5Tm09rXHii6Zv2qDNpsKlIYE1I234UJyU7DlplxLWivSNP6wr1fiSEsD/kr1MElAWrtQmpyVOCk17jd+QOHlPq/bYiY/TJcmeMxeu1CYnfWtyiC/4jO+SPSftyQnvkew5LWOlLFxqK7Up0zJW8JsxSJyt6pNoGSspTk3ftGn6XGU60oIP9lPl4fBTZRnkxE+Vh+OWnir7zal64HcV4iQ+4tTCb07VI+VQOxG3O05LPZvenHLh1gO/XbjD4cKVYY3TUk8XrgtXhCWHLlwZ1jgt9XThunBFWHLowpVhjdNSTxeuC1eEJYcuXBnWOC31dOG6cEVYcujClWGN01JPF+5tKtyFCxeGl156KXz44YfxdVdXlws3gwu3AB/qwh2O0RIu+x9//PEwffr00NPTE/fxN1wX7nDctsK1LsDQFppEWRLAH721YgGWQhOndQFG1ePkF9nHjBkT3n777TB16tQ44DjitmsBBj5bFyZoxUKuLTkcyQIMLdodp8WXpgswvv3227Bnz574yMtW7OvrC7t37xZtOXft2hV27Ngh2iTSdmBgQLTlxAd80fg9ODgYtm7dGrZs2RK3pTY58aUKcRIfcaZtir5s2bLw/vvvxz7SZPTCCy+EjRs3RtHOmDEjDA0N1fUlUZtDyOdZ4yQ3ki0nudb2TQ2pJTXV1DPlUFvPdseZ6tmK+I02GwqXB0tzqNeQ97CGUrLlZNZisbZkk8gzZ5m9JFtO1qjiC0cZyZ6TNZ8coSSbxLSYXrLlbGecxEecaZsZe/v27WHNmjVRqJMmTYqD4amnnorFXrx4cZg/f35dP41oySE+47tkk0hOyI1ky0muLTmkltRUsuVMOWTMSPac7Y4z1VNDtNlQuJZrXGZ87WkBpxwkQYsUvAbWUw7ivN3WKuPfrFmzwoQJE+JRGFivcS05xGd814KcaC8JiMWSwztlrbLfnLpN7yrn8D8H1SPlUDsRtztOSz1duC5cEZYcunBlWOO01NOF68IVYcmhC1eGNU5LPV24LlwRlhy6cGVY47TU04XrwhVhyaELV4Y1Tks9XbguXBGWHLpwZVjjtNTThevCFWHJoQtXhjVOSz2bCtefOVUP/K5CnMASJ3/HbdeSR3z2v+PWwxqnJedNlzySBGYZDdMqEcmWk3a0l2wSWa1CUJItZ1ppw2oYyV4mhUgrp0iw1CanJU4KZ42T90i2nOUVYq3IwJw3b14k21KbnPStySHEZ3yXbBLJiTZOy1ihhuWVU1KbMomPvhkzkj0nY9AaZ7s0kSaopNdhwiUBdEiSm5E2HLo51Ev2nDzmkvaSLSd9M7uQMI0vJJe++V+yl0nB9u/fH9e1UkSpTc6RxKnxG1rjpEaSLSez+Zw5cyLTEawV6VuTQ3zFZ3yX7DlpT07IjWTPSa61Y4UaUktqSm2lNmVaxko5Tm09RxKnpm/aHDp0qLFwcVILPrgKp5DpukUL4rwTTpWt17iWvtt9CmnJofVUmbFSlVNly7hFmw2FywygBR+qdZIEWAYGCeD0QIOUAG0x/OaUDEsO8dkiLnKinaDItSWHfnPKhSsCv124w+HClWGN01JPF64LV4Qlhy5cGdY4LfV04bpwRVhy6MKVYY3TUk8XrgtXhCWHLlwZ1jgt9XThunBFWHLowpVhjdNSTxeuC1eEJYcuXBnWOC31dOG6cEVYcujClWGN01LPpsK1LMDASW0CcNKSAOsCDEuhifNOWIDha5VlEKd2gmp3nJacN12AwS9705mGzHIs75JsOVk6Rv+STSKzC+s4JVtOfKBvZi/JXiaJ5RfMWSbHttQmJ31XIU7iI+eSLSdLAT/66KNItqU2Oelbk0OIz/gu2SSSE3Ij2XKmekq2nNSQWlJTTT2Jz1LPdseprSdEm/QvCpdHQDJjMNO0IkExKCRbTtaREpBky8nnE1Q6GrUipzOWvjm1IgnaOOnbGqe2b2uc5Fyy5WQ259GskG2pTU765jMkW058xnfJlpNckBNyI9lzkmtLPaklNbXU0xqnpW9LnNp68vm37PGszF6WU0hmDS2YPUmuBtZrP2Y56zVuFeIEljhHco2rBT7juxbkhNxoYD2FtFzjAuJs57W8JU5LztHmLROu1klmjXYN6JQAbTFGItwqxGmdoPzmVD1SDrUTcbvjtNTThevCFWHJoQtXhjVOSz1duC5cEZYcunBlWOO01NOF68IVYcmhC1eGNU5LPV24LlwRlhy6cGVY47TU04XrwhVhyaELV4Y1Tks9XbguXBGWHLpwZVjjtNTzlgpXm4CRDGhtAqwDeiTC1cZpHXQW4QJLnCMRrhYjGdDayY9cW3JoES4gTu0ExRhsl3DTAUeLpsIlASRYQ1aJsPpDsuVkNUlagaIhAbFqRbLlZBCllTaSvUySRaFZbcO21CYnflchTuIjTsmWk4GZVk6xLbXJqc0hxGd8l2wSyQm5kWw5ybU2h9QwrZzS1DPlkDEj2XO2O05tPSHabChcHgHJDMPM0Yy0oT2OSvactKO9ZMtJ38wuLAfT+EJi6Zv/JXuZFCI9npUES21yWuKkELTX+A2Jk/do46R4ki0ngzitVWZbapOTvjU5xFd8xnfJnpP25IT3SPaclrFCDdPjWamt1KZMy1jBb8YgcWrraRkrKU5N37RpulYZJ7UgeGYCDZjpcEALHNWeQjIw8UV7+sMAtZ4qVyFO6yWBX+PWI+WQMaNBu+O01BNtunBduHWw5NCFK8Map6WeLlwXrghLDl24MqxxWurpwnXhirDk0IUrwxqnpZ4uXBeuCEsOXbgyrHFa6unCdeGKsOTQhSvDGqelni5cF64ISw5duDKscVrq6cJ14Yqw5NCFK8Map6WeLlwXrghLDl24MqxxWurZVLj+eNZ64HcV4gSWOP3xrDKIUztBtTtOS86bPp6VJY84igOtSHtmDMmWk+VdzBiSLSefj5NpKWArEryl7wMHDoShoSF1nPRtjVPbtzVOci7ZcnKkSL9In44arUjffIZky4nP+C7ZcpILckJuJHtOcm2pJ7WkppZ6WuO09G2JU1tPPr/pL9Ize1FoFkC3Iu+hQ8mWkw9n3adky8nnp3Wtkj0n61XxRbLlpG8SQKG1ceK3NU5t3+2Kk1n/448/jmRbapOTvvkMyZYTn/FdsuUkF2nduWTPSa4tY4VaUlNtzkcSp2WsWOK0jNt0ZsF7oJ8qtwB++6nycPipsgxrnJaco82GwuVQrwWHeq2TJMDiJAlgltGABOCLthi3882p8gTjN6fqkXKonYjbHWerepaBNl24t4FwORJMnjw59Pb2xtd8hW/s2LFh0aJF8TVHWxfucLhwC/ChLtzh+LGEy/bcuXPDT37yk9DT0xN27doVJk6cGGv47LPPxhgXL17sws3gwi3Ah7pwh6OdcYJyjBxx33nnnbB169awYsWK8O6778b9b775ZjwKL1myxIWbwYVbwIVbj3YLd+bMmWHcuHHxTiqYNGlSPOJ2d3eHqVOnxn2vvvpq6O/vd+EKcOEWcOHWo51xEh9/buDPE8mfP/3pT1G03HFE0LNmzQrjx4+Pf+747LPPXLgZXLgFXLj1aLdw876//fbbm7Hs2LEjTJ8+Pf5WLEC0LtzhuG2F63/HrQd+VyFOYInTKlxL3/jczr9vWnLof8ctdjJ7MctoSEcEJdlyEhCfIdkkckpIUJItJ6eF+JJWmDQjhWCVDUcltqU2OfG7CnESH3FKtpwMntmzZ0eyLbXJqc0hxGd8l2wSyQm5kWw5ybU2h9SQWlJTTT1TDhkzkj1nu+PU1hOiTVG4dMJNDxq0IrMcj4s8fPiwaM9Ju/T821ZMfVMMtqU2ObV986veFJr1rWxLbXKOJE6L37xH215bHwq8ZcuWyDQht6Kl9iOppzWHki0nNaSW1NRST2l/TvxmDNLeWk/JljPFaak9Gq0TLuTGBzPM7UxivN3jpJbM/OkMQGpzu/BOqCckxh+0eir8HytVAcoX1TTeAAAAAElFTkSuQmCC)
- x = 1.2, x = 1.4
- Only one solution, x = 5
- Two solutions
- No solution
The correct answer is: No solution
As parabola is neither intersecting nor touching X-axis ,So there is no Solution for given quadratic equation
Related Questions to study
Mathematics
Determine the solution of the quadratic equation
by factoring.
Determine the solution of the quadratic equation
by factoring.
MathematicsGrade10
Mathematics
Find the solution of the quadratic equation
.
Find the solution of the quadratic equation
.
MathematicsGrade10
Mathematics
Convert the quadratic equation
into factored form.
Convert the quadratic equation
into factored form.
MathematicsGrade10
Mathematics
Determine the solutions of the quadratic equation
by factoring.
Determine the solutions of the quadratic equation
by factoring.
MathematicsGrade10
Mathematics
Determine the solutions of the quadratic equation
by factorization.
Determine the solutions of the quadratic equation
by factorization.
MathematicsGrade10
Mathematics
Determine the solutions of the quadratic equation
by factorization.
Determine the solutions of the quadratic equation
by factorization.
MathematicsGrade10
Mathematics
Determine the factored form of the quadratic equation
by factorization.
Determine the factored form of the quadratic equation
by factorization.
MathematicsGrade10
Mathematics
Write the equation (x-3)(x-4)=0 into the standard form of the quadratic equation and solve.
Write the equation (x-3)(x-4)=0 into the standard form of the quadratic equation and solve.
MathematicsGrade10
Maths
A Linear-quadratic system of equations can have _______________ real solutions.
A Linear-quadratic system of equations can have _______________ real solutions.
MathsGrade-10
Maths
What are the solutions of the equation.
![x squared space equals space 169](data:image/png;base64,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)
What are the solutions of the equation.
![x squared space equals space 169](data:image/png;base64,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)
MathsGrade-10
Maths
Compare each pair of radical expressions.
![square root of 36 space and space 3 square root of 6](data:image/png;base64,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)
Compare each pair of radical expressions.
![square root of 36 space and space 3 square root of 6](data:image/png;base64,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)
MathsGrade-10
Maths
Solve equation ![left parenthesis 2 space x minus 1 right parenthesis left parenthesis x plus 3 right parenthesis equals 0](data:image/png;base64,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)
Solve equation ![left parenthesis 2 space x minus 1 right parenthesis left parenthesis x plus 3 right parenthesis equals 0](data:image/png;base64,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)
MathsGrade-10
Maths
A quadratic equation can be written in standard form
where _______.
A quadratic equation can be written in standard form
where _______.
MathsGrade-10
10th-Grade-Math---USA
Identify the vertex form of x2 - 8x + 11 = y
Identify the vertex form of x2 - 8x + 11 = y
10th-Grade-Math---USASolving-Quadratic-Equations
10th-Grade-Math---USA
The co-ordinates of the vertex of x2 - 12x + 20 = 0 is
The co-ordinates of the vertex of x2 - 12x + 20 = 0 is
10th-Grade-Math---USASolving-Quadratic-Equations