Mathematics
Grade10
Easy
Question
Identify the function that has a minimum value of 1.
Hint:
Finding the minimum value of the equation that equals to 1
The correct answer is: ![x squared plus 1](data:image/png;base64,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)
The function x2 + 1 has the minimum value of 1.
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State the equation of the axis of symmetry for the given graph below.
![](data:image/png;base64,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)
So, the equation of the axis of symmetry for the given graph is is x = -3.
State the equation of the axis of symmetry for the given graph below.
![](data:image/png;base64,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)
MathematicsGrade10
So, the equation of the axis of symmetry for the given graph is is x = -3.
Mathematics
Find the domain of the function
.
Find the domain of the function
.
MathematicsGrade10
Mathematics
Find the domain and range of the function from the graph.
![](data:image/png;base64,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)
Therefore, for the given graph Domain is [-2, 2] and Range is [1, 5].
Find the domain and range of the function from the graph.
![](data:image/png;base64,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)
MathematicsGrade10
Therefore, for the given graph Domain is [-2, 2] and Range is [1, 5].
Mathematics
Find the y-intercept of the graph of the function.
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)
Find the y-intercept of the graph of the function.
![](data:image/png;base64,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)
MathematicsGrade10
Mathematics
Find the x-intercept of the graph of the function.
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)
Find the x-intercept of the graph of the function.
![](data:image/png;base64,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)
MathematicsGrade10
Mathematics
Look at the graph and find the range of the function.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfYAAAFvCAMAAACPXBkFAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAGhUExURdnZ2dra2tra2tnZ2UqsxUqsxkurxkusxUusxkusx0utxkutx0ysxkysx0ytxkytx02txk2tx0+uyFCux1Cvx1CvyFGvyFOwyFWxylauxVaxyliwx1lZWVqzyltbW1u0y1xcXFy0y12vxV5eXl62zGBgYGFhYWGzyWK3zWRkZGW0yme5z2hoaGq70Gu2y2xsbG280XC90XG+0nNzc3O+03Z2dnjB1Xl5eXnC1Hp6eny8zX5+fn61w37E1oCAgIGBgYKCgoK1w4TF2ITG2Ia/z4eHh4nAzonJ2ouLi42NjY7Bz4/M3JKSkpXO3piYmJrR35ubm5ycnJ+fn6DT4aOjo6PI0aPU4qXV4qampqenp6rY5Kurq6ysrLDa5rGxsbOzs7Xd57bO1bi4uLq6urvg6b29vb7i6r+/v7/i6sHi68LCwsXFxcbl7cfU18jIyMrKyszV2Mzn787OztDQ0NLq8dTU1NXr8tfX19ft8tnZ2dvb293v9OPy9uTk5Oj1+Onp6en0+Orq6uzs7O73+vHx8fT6+/j4+Pn5+fn8/fz8/P///yzRQcwAAAAEdFJOU4efx9+nhZkZAAAACXBIWXMAABcRAAAXEQHKJvM/AAATuklEQVR4Xu2d/18jRxnH65eec/2iohaVpl9Q2wPRghaj9kSr1IOWUlTQKCeKloq02BqlwskJaop8+aud2Z0km2Sf2Znsk4eQ+bx/uFty93pen903OzszmUweeeQBiI6PwXqUaO1XIDKgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqi1X46/cJH9rDJ6fR3/2cPR51ote9WXrdHLS6XK+/Zw1EnVu3ns8//0x62OazEcrvHqj3XcO7vwkgSqXbdnt+3h1k2cl8dQSLVTtzXu7G08pFqP6z09OMNp9ORtPLxaP/wp5UUc0Pb2/q/s2mrrtv8pF9/PhtJXz4a7buVyvN3p7X1u2+1NetXk9t71978xCN/9IhF++l05V3917up35ZefaBve/2P9ibf6B3NjySxaLetutZsBLcbc238vpbd7Mm1j0abOLW3b2/TzP8+benTn6B9lLCNvH2WZ7TrX4RK+4EO7SPGhu3SJYYz2rXpzGAO2keLw8p33tK39asfJD/pZ3vzBteHlXY/Ds/20WKjfXtrMtp13/3vldY/oic/Uugn+OuZ29j8mB4dmof9RrOZ16+3HvMjTSx3u36Ca56/++oHif1mY57e9vpRn/4WtAd2I04s2i9/rp0ns3SJ7+acvNWvfykS3ZiTHzGa769/aKZnWl35pInX6Mbd6k//18gTifb2G61pp414iMfSo4tFe2vBZNN37n2N1TUjhum0Gc2Xf7TNOtbSRfFs/43uzL189/u6M2/maDU57bluCeLox8ej/epfvzDd+Jd/9x/7M9bJR6EdZIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KIH2KBll7Zdmf5JkNfyhPshuWhE9o6x9Qys/TLwfxvIhJ19GvpHfMPc4tHcx8tp3oT0H3O1R4qH9wU3m/Rff0n++bXp0z76TvhQN1l8exdptjZvJ4Q+/+jd7+ODNym/tUYvdXXswmliDOfhotwdlYSsUUGkj07qfz/Z8tHl31x6U5jpOrgBXodHWvpv9wPrlcs/nmKGdRCRGGL6Vdjs2qMHd3maUtR82rV8u65v+crl3lg7aSURihOFXKZmb1SRzdZqcrSqgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnUQkRhhslaCdRCRGGGyVoJ1EJEYYbJWgnYQpRmPvjXs7J/aHknhGau8nf3U+qw8ze9RZoJ2EJ0b9OaV5atP+WA7PSO395E+n72vHvd6hnYQlRl2Naeu3xtS6faEUIZGSHaY3zOZk2IWyjYz2xjPGuuYxdWxfKkNIJLOf/Plssi/hbs/24tBOwhFjWz2aaldqzb5UhpBI5m4/nU6a98OeVh7aSewm1aV4zTpXauwl+5IQyX7yb6dbitu/MmBjcRJbohSvfNpaV2N37EsypPvJQ3s3Mo38lpWutS/Zl8rgHyndTx6NfDcy2o/Vbatd7duXyuAdyY7ZkvEbunQZZLRfravHE+lPfM2+UArfSM395NOhGwZwbYS0X6wodfv2Z/QAbse+UgbPSK395NOj3psd2mmYYtSX7jy98C2lxh/aF0rgFymzn7z2Xqn0Wod2Gs4YZ1NKzVzYn/uHLRK0k7DGOBpXasX+3D9skaCdhDeGGcqVfryzRYJ2EuYYiwyPd7ZI0E7CHIPj8c4WCdpJuGMwPN7ZIkE7CXuM8o93tkjQTsIfQz/eJ0otr2KLBO0k/DHM432+zOOdLRK0kwwgxpFu5mv2uB/YIkE7ySBi1LT3A3vcB2yRoJ1kIDGqSk2e2eNw2CJBO8lAYpxMKLVoj8NhiwTtJIOJsa+b+W17HAxbJGgnGVCM1RKTtGyRoJ1kQDEuZpSa63MUxxYJ2kkGFePheN+L5tkiQTvJwGKYSdq6PQ6DLRK0kwwuxqIexTXscRBskaCdZHAxGpNKLdjjINgiQTvJAGMc6GZ+yx6HwBYJ2kkGGWO9v1EcWyRoJxlkjIv5vpbasEWCdpKBxuhvFMcWCdpJBhtjp59RHFskaCcZcIx+RnFskaCdZMAxzvQoLvS9OLZI0E4y6BhmFBf4XhxbJGgnGXiM8FEcWyRoJxl4DDOKC3svji0StJMMPkbwKI4tErSTCMQwo7iQFZVskaCdRCJG4CiOLRK0k0jEMO/FBYzi2CJBO4lIDDOK8/9cHFskaCcRiXG1FjKK8450uZzuUGa2rqlUzKbDnUA7iUiMq4u5gM/F+UYytlPtOdsVGaCdRCRGOorz3XXcM9Lp9H278SS0dzE02q+2/Udx/pGgPZ/h0Z6M4vw+F+cfCdrzGSLtZhTntxGxf6SmdtOjw3aEbXy0S/EH3cz/0h4zkd1L/M2efcWxsTiNLSHBPaU+/xd7zENW+4ff+JE9agHtJAX/7E9xId9RnH+k7Bby2GG6zVBpT0ZxHrub+EfKaj+fTb8TLgO0k4jEaOI3ivOPlGq/XNZ/Xi5jlq7FkGn3ey/OM9LptOnAV3TTnvTke5p4aHcgEqOF2bysao9J2CJBO4lIjDbmvbiixztbJGgnEYmRwWPzMrZI0E4iEiOL2bzM/XhniwTtJCIxshQvtWGLBO0kIjE6qOtm3vmxd7ZI0E4iEqMTs9TmyB7nwRYJ2klEYnRiPjAx5XgPli0StJOIxOiiYG9StkjQTiISo5s95+OdLRK0k4jE6GHF9XhniwTtJCIxejB7k5KPd7ZI0E4iEqOXh/rxTk3Os0WCdhKRGDmYrceJyXm2SNBOIhIjj3XtPX83I7ZI0E4iEiOXKvXFYWyRoJ1EJEYuDeqLw9giQTuJSIx8zPeCrtrjLGyRoJ1EJAaBWVqX8/lntkjQTiISg8LM2vR+/pktErSTiMSgyH9Thi0StJOIxCDJfVOGLRK0k4jEoDFrLro/984WCdpJRGI42NTe9+yxhS0StJOIxHCxpLt1nUtp2SJBO4lIDBemW9c5W8cWCdpJRGI4MbN1M9nuPFskaCcRieHmeFypamaWli0StJOIxCjAdOczs7RskaCdRCRGEeaLQTftMWMkaCcRiVHIqva+b4/5IkE7iUiMQi6qehh3bH9giwTtJCIxijEffJ+0wzi2SNBOIhLDA7Omcir1zhYJ2klEYvhQ18O4uWT4zhYJ2klEYnjR8s4WCdpJRGL4Yb5TxnyHlHel5n7yV+ezFbvHeAfQTiISwxPjfeHfe2/c28ldUdtNaz/50+n72nGvd2gnEYnhy7ZSt76g3aun2pM3JO395DfM5mTYhbLNDdN+VbulntTWb435fedAqv18Vt/sWnLPHtPQTiISw5vGF411zWOqOXnjItV+Op3c89mdSFOgnUQkhjfb6tFUu98XRaamrW9ob+GjfZh4zTpXauwl+5KLdGNxu714dpfxFGwsTmJLDAmvfNpaV2N37EsuUtPvvwjtndy0Rt68A5sy5vMFI81nO7p0ndw07cfqttWu/mRfcpFqT4duGMC1uWnar9bV44n0Jx6b8ZiyaXXmzHRN73cEQTuJSAx/LlaUun17TA/g1FTBt4O295PX3vHNUFlunParq/rSnacX9vbGlZrwGbq7gHYSkRhhJJXqE0qN529y4g20k4jECCOtdGy8d31MKhBoJxGJEYat9HBKd+185upIoJ1EJEYYzUonM9p7ldq00ANoJxGJEUar0tmi9j7j/XX/PUA7iUiMMDKVzDfLTLQW0IcC7SQiMcLIVtrXAzmfb4rMBdpJRGKE0VHp2HTsFvt7wEM7iUiMMDornVXNA95rcV030E4iEiOM7kpr5gGfs39dIdBOIhIjjJ5KO+YBvxLe0EM7iUiMMHorHZkR/JTr26RygXYSkRhh5FQyb8yF9+ihnUQkRhi5lfYntPf5wi8B7wDaSURihJFfqWF69BNB781AO4lIjDCoSpuhPTtoJxGJEQZZ6dj07Cb9b3hoJxGJEQZd6cLscaMWfJ/w0E4iEiMMV6W6mav1nbuBdhKRGGE4K12Yb5RS817vxkI7iUiMMAoqJXM34x6fhIZ2GpEYYRRVSm/4uc5tqfOAdhKRGGEUVzqaM+KXirp20E4iEiMMn0rJGH68lvc1cm2gnUQkRhhelU7MOjs16VxwBe0kIjHC8Kx0kLT0VcdHZ6CdRCRGGN6VtieN+DXyEQ/tJCIxwvCvdLZuHvETNWKeHtpJRGKEEVIpfcRPbOX27aCdRCRGGGGV0kf8ZN58LbSTiMQII7TSnpmnVzO9nXpoJxGJEUZ4pa2kbzfXLR7aSURihNFHpbOa6dt1i4d2EpEYYfRVqWFW03eJh3YSkRhh9FnpJFldmxUP7SQiMcIIrmR2LKpUXvioU3xj78c/8NuhvJhrPDkKV6FItLd2qcqIrz9njnx2KPfgGk+OwlUoNu1a/FraufuVGtN/+e5QXsQ1nhyFq1B82k3nzoj/VNAO5UVc48lRuArFqD0R/8mwHcqLuMaTo3AV8tF+83nb9Oiefcf+ZPjr161zzx3KbyTWYA5xaE94s2Nf8cAdym8k1mAOcTTyCeezr9sjQ3uH8ie/WWKLsybXfXI5uApFpL1zY/HMDuWPjq+VHr1f98nl4CoU7d2e2aHc/LlSsjt/3SeXg6tQFNovl98zf7zwkf05oblD+cKf5xP98zvuVbZuru/kSFyF4rjbk8nZnu+OqC995csL5uOxR0uJ+InV/vezvMaTo3AViqiRz6H1VszJqtkLo8QtP4Qn5yoE7ZaLHfPJOXPLB298ZBjCk3MVgvY2R+nbNGqqFt7YD+HJuQpBe5bGZrLqTqm57bC9j4bx5FyFoL2L+kryBp1SizshszhDeHKuQtDew8VesrQ+zPwQnpyrELTncbZtNjtLzfu19kN4cq5C0E5wspV8qkJT3faYuh3Ck3MVgnaak9Y9P7O2XzCeH8KTcxWCdieN7QVrXi1suqbth/DkXIWgvYiznaV0Bk+pyRXyST+EJ+cqBO0+HK03H/Rqbj13J6QhPDlXIWj3pLGzlHyOTjO+uN01jdfYe+Pe0K24dxWC9gCON9P3aDWTSxn1w7ni3lUI2sM421tp3vQt9fXhXHHvKgTt4TzcWrATuIn6fzxjrGuGbMW9qxC098fRZkv9sK64dxWC9v6x6u2nazRj8/ZfyiByvaG9HFr955I1mIYnv7RVvM9tESLXG9pLk1lxb/6YX90p9YgXud7QXprsinv7t6qu7/U7jBe53tBenuaK+89+e2spXZCXMFFd3TwIly9yvaG9PK0V92ZRxsVBbdGuzEqZX6zth6zKFLne0M5BfenO08mKe0ujXltovn+TMlVd3z7wWqsjcr2hnYecSI2DrbVqa0ovpbpQ23Y2/Iyz+66rBO080JEO9mqLrffvLDPV9dpBXsvPObvvukrQzkNRpIcHtdVqZ7uv1GR1pbafHemzzu67IkE7D56RDurafkePT6O7/LW6ufcbrLP7rkjQzkNYpIcHW7Vq601cy1T1e6yz+65I0M5DX5HODnZqi81lmhre2X1XJGjnoUyks4Pt2kJy77dm98dm7L+VwBUJ2nlgiHRy8BMrXWtfsi+WwBUJ2nlgiZSZ3e/cAL0vXJGgnQeeSK3Z/QX7QhlckaCdB55IHbP7ZXFFgnYeuCJ1z+6XwBUpEu3ns5VK5T37Q5vh0y50vePQfjp9Xzvu9Q7tJCIxwgiutGE2J+vchTIB2klEYoQRWul8Vt/sWnLX9uLQ7kAkRhihlU6nk+b9sKeVh3aSB7s3nl9Xfpb5KxpKade3xE0nUu3WXx4e2m8+ZCMfLZFoJ7p00RKF9nToljOAi5YotOvm3UzX4GZvEYf2ZEN5WG8TiXbQCbRHCbRHCbRHCbRHCbRHCbRHCbRHCbRHCbRHCbRHCbRHSbH2y+VKpdL5Zch9klTq+DLtvtGlGJZMEKvn+4AnD+clcmsr1r5x31wfDu8b+nwOWU7KvKFW/jJTq+fD4cmj4btEbm2ejTzfe9UbDL9A2hfHAilq9XwwTHmacFyiFFKbuPZdnnNiuMzk6vl+4NTOdIk0JbUnq1N4YPpVZrjMrAsrh/Jup7V5dunYrNvVjKVhuMy2xNBp57lEbm1+d/v5LFMjf7nM9Js8utrZLpFLm0N7dv3Z+WyZ3mW70ka5X592IYbLPKSNfMlL1AGpzbNLx7TYmGW0lMCiPWkDh6xLx3eJNKQ2T+3l7vYmu3x9BIbLzLp6nks74yXS9H+3n8/q87lc5rglGMcDLJeZc/U8k3a2S1SgrfhuN8/TCscdkfQtNeXbjdPppFDpUNneSxm48jBeogJtno08GC2gPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUqgPUoS7SA+Hvm4PQDx8OAT/weJ+YOAT+1GNgAAAABJRU5ErkJggg==)
Look at the graph and find the range of the function.
![](data:image/png;base64,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)
MathematicsGrade10
Mathematics
Find the range of the function
.
Find the range of the function
.
MathematicsGrade10
Mathematics
Find the domain of the function
.
Hence the domain is the set of all real numbers.
Find the domain of the function
.
MathematicsGrade10
Hence the domain is the set of all real numbers.
Mathematics
Look at the graph and find the domain of the function.
![](data:image/png;base64,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)
Look at the graph and find the domain of the function.
![](data:image/png;base64,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)
MathematicsGrade10
Maths
Which of the following function is the vertical translation of ![f left parenthesis x right parenthesis equals square root of x](data:image/png;base64,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)
Which of the following function is the vertical translation of ![f left parenthesis x right parenthesis equals square root of x](data:image/png;base64,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)
MathsGrade-10
Maths
Find the minimum point of the function ![f left parenthesis x right parenthesis equals square root of x minus 7 end root](data:image/png;base64,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)
Find the minimum point of the function ![f left parenthesis x right parenthesis equals square root of x minus 7 end root](data:image/png;base64,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)
MathsGrade-10