Mathematics
Grade-1
Easy
Question
A quadrilateral has _____ vertices.
- 1
- 2
- 3
- 4
The correct answer is: 4
A quadrilateral has 4 vertices.
Related Questions to study
Mathematics
A hexagon has _____ sides.
A hexagon has _____ sides.
MathematicsGrade-1
Mathematics
Count the number of vertices present in the polygon.
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)
Count the number of vertices present in the polygon.
![](data:image/png;base64,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)
MathematicsGrade-1
Mathematics
Draw a polygon with 4 sides that are of different lengths.
Draw a polygon with 4 sides that are of different lengths.
MathematicsGrade-1
Mathematics
Sarah connects all the dots to make a shape. Name the shape that she makes.
![](data:image/png;base64,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)
Sarah connects all the dots to make a shape. Name the shape that she makes.
![](data:image/png;base64,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)
MathematicsGrade-1
Mathematics
Marcos has 2 toothpicks. He places them as shown below.
![](data:image/png;base64,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)
What shape can Marcos make if he adds one more toothpick?
Marcos has 2 toothpicks. He places them as shown below.
![](data:image/png;base64,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)
What shape can Marcos make if he adds one more toothpick?
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Mathematics
Find the number of quadrilaterals from the tangram below.
![](data:image/png;base64,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)
Find the number of quadrilaterals from the tangram below.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJsAAACqCAYAAAC6Rz2EAAAgAElEQVR4nO2deZxdVZXvv2vtc869NSaEEOYAoREcn4pMvme/7n6fbtuhWwUUFWSeRJlVUEAihEBoQMCBwQFFQGRGBkVtVEZBRtMIAQIEBMwcMtRwz9l7vT/2uVWVkZBUblUl9xc2deveOuP9nbX3+u211hYzM5poogHQoT6BJjYcNMnWRMPQJFsTDUOTbE00DE2yNdEwNMnWRMPQJFsTDUOTbE00DE2yNdEwNMnWRMPQJFsTDUOTbE00DMlQn8Bgw8omFlsoPAFDEqUXT48YWQGZB6eKJlBIwABFkJXsd2Xvrwo5imCkVgOE3CeIOtQKnCrocLj9huEx8wTrIVhAUSDBzKGSIrImV98P1WjThsPVDjqkDGQxiUQSFXJfkKhj/vQZXHPl1UhNSF2GmANcuWUgUhWWopeByLLBMQO/gAGfWf/7hUSyJVbDS6B17GgOOvJAWlpSAsOlWxHi7VJUMlQC0kc2Yc0esxVjvSNbJFq0VIVAUDDzCPDasy9w3vGnsri7xrx5Pey0/XtJalWyogVM8FrQRxyRPjtnWB+BBxxpwOsBn4n2fVK3EWKennQJT819mL322Ztqy5hB/ArXHtL3sAllvwA41tKgLYf1jmwQCKHAA6E0384Lf5v+ElOOP4WjP/Z5OsZsykU/+gk637PTVjtRyTtxluLFx1stsCy3VtsKLbOdWIJJYEllAa8vmYkGouUYRmyrd5Nmbqn3rP+5GxSsd2QzizdJnMMXniw45s6YxTlHf52jPrEvO240nt4AX93vcC758TW89NzTvHPCB7BaQmYtZZe59N1d087E8KilGAk1l+MKh4qt8BhDi8gqWcZa95/i4Jzr8Bg2DCYEimD4IKg5Xn3+FSZ+8USO+8SB7NC5FS5PaPHKaIFjD9gX1YU8/uKD1LIlWN2rWKbFf2Gp1u+K2MrflwLDgwliiuDBPGrGckPAIYNB7AfoN8tW/u5ZzlSvBUYk2WxAw8DM+hugSQrBeG36y0w66TSO3HM//qFzC1qKDAuCmJGZpy0zjvriFyjcfJ5++TEK102hNYIUBPHlzxpB8/L3/ual6GsrfV9zCs0JaiWRQ2zleQ4fhNiWMmB9d3jQMGLJVgChvB+hCFgeCD7gixwjZ+6Lr3DhMV/n+P/3Gd4xakuSAKrgBBSHahVHQqs3vnHIwaRuDv/z6gMU6WLwRuozkhDHWyYeE4mDl7fSSBEcYiF2nyRAgneCDZs7H88znpuUY4boIPS9N0gYNpf8ViCAUnZxYuCIg3sxLBizpr3C5GO/wcH/8Tm2G7s12mMoKX03E4kShUGWpFRdwrEHH0YI85g2/XGKrIcezSlEwTIIyYAjr36r/+v7Dpfax3DCis5JVvL+mmNEkg0z1AJKwEvAYwQViqLgtekvc+4xp3Lwv+/DNqPHk/kMRwo4bOCwhCjimvek6mhR44TDvwA6n2l/e4xadTE1lwMpailiw40gIw8jkmyCYT6nyGv4EAgWcKa8Pv0Vzj1pIkd85PPsOGprOosM5x1YEgfpOsC1J47/HYIGI8PoTIxjDv8CvTKLZ156hJD2ECii51hyrZn5uOYYkWSL37egLsEXHueVeS/NZPLRJ3Poh/dmx022IcvBBYEiRFatYBCsCM4EDaC5kFpKR6qccPABJCxg2vMP4bPF9ErX0FzoeoYRSTYAHyAEwZEw68XX+OaRJ3DM3oeyY+fWaO5JxAFxPIcYXgN+VT2hpUitShZSRrvACQd/Dsdcnn7pIUIW5wzNbJjpYyMLw5ZsA+UNq8sboWyAaIKY8trzM5h49MkctecB/EN1E1prSRxfiWASQDwmdb0orPRgIg4hQXNITWhP4fijDkLdQqa99DheagQ8FgwJ0bmoK3BNrB6GLdmglDcgfrHeosQRAoX3FCLMnvEa3z72NI75t8/wjratyPLowoskiEj04MXiTJ8JbmV6gwBSgPaCCkYGVKkgHH/Avkgyk6def4AiW1zuK0VNMckxKRpyL9YHDGuyad22lfKGOcM0TlzOnf43Jh79NQ79xOf4h3FbIzWP0wSRNbykpTz9KFk4cVQSx3EHH0ZvPotpLzxOLe2ix9UoRKIsMmA+sYlVY/iSzQJqHsXjJVAQCAJ5XuOVZ19gypdO5vB/35utN9qMzAtOFEK0fGt/bCAYEozMpbS4wElHHYy4BTzzt0fpSRdRcwVYhgvp2h9vA8HwJRsQigLvC0IIhGA4U2a++Crnff0MDv3Ip9lp7Hg6CofzEqcTVFhTwzYQUTQWnAgSjKTwdGjg6MP2I7h5TJvxKGS9BMmXGrGFEJrSyCowfMnW5x0oRRFIgjL72b8x+ctf5/CP7MOO47Yh6xVcEamByoCN1h5ioAFcgISUlIw2B8cdtB+pLOCZ5x6kSBdS0+7+bZqe6ioxfMmGYAhmSkKM3vjml7/KMZ/Yn53at0BzUHNIXeIY/NmVCAMJGZpXqYSE0eo57sDP4nQef53xEJb19gUBRKekSbiVYUjJNlDawOiXNqwUFVyKBeHVZ2dwzvGn8aW9DmSbtk2p1FJcGYoX9V3tnxJYJycqYA71ivNCRyZ8+dD9ccli/vrioxRJb1/gJX2ySD3kqNxFs3sdestmA15YMHzuCWbUgscDM196lfNP+CZf/vd92KlzKzKrYJqgBq4egr0ujUldFpHecjBXQaRKa+I47sD9kGwOf3n1AXxLN14FsyRaWykwmrLIQAwx2eqx/TF6o8DjXcATwGD2tJeZfNzXOeQ/92H8mM2QXk8iijbaSAyQRAxBTEgloUUdXzn0MCjmMe25R8ndYvKkwBuoz9Cmp7oUhpRsYhajV8XHbsgJ4gRfFLz23Iucf9wpHPHRz7D9qM1otZRMXBnD3+gTjb1jqN+tEHDBqIqjzTxfPXw/0HlMe/kR8mwRheQ4S3G23kXdrxWGvBv1vsB7TxECYoLUYN7LszjrhFM45N/2YqdRW9CaK64gTojCuhubrQQmxGDHkuWKxgl8byTe06HGlw/ZF60s5NkZjyFpTwy4XNYz3sCHbUPuIASDgBC84byw4OXZnHHEiZy454G8fdy2pL1CYgl4KyNgBz9c+c1Ql0H60hL6PhDEEhLJaEvguEO+AH42z854hG43D0sHjNmaXupQWzZBxBFMkKC8/OyLnHb4cRzzyQPYNhuHFoLTNHqbKkPQfw4402WJ1vdBFXwrValQLbo54fD98Mziub8/QY8sHopTHbZoONnqmlQI9URiQVHmvPQ3ppx4Gkd88vNs374prTWNk93BBuRw1iMY16LVB18BsFC2eph4GfO2bLMBP5f9m+ChFH+rAToT4ZhD9yfYXJ575QkKV8NTEIjeaT1OZENUQoaEbN57APIix2O89sJLnHX0Vzn2Y/vwzo3Hk5ojJAlBBHMOEyGoRp4IBJE1bHFbi0FuQIFJQRDBS4KJYqygyTJtwGdxEJCDV8RakVClzWUce9ABkM7nqVf+RKj0EtRj6hFZJjZ9A8KQdKN1gVO8MfOZl5hy4ukcsdf+bDl6c6wGEL/4oBKN0CA1r0ae1ChcjneClwwvKblCoUYuKcVbbZoSXIrXlFwzChJMKqRJC18+9BCQRUx7/mnMWjFrJ6AgPSD5UNz6IcWQ+OaqSp7nvPriDL577Okc9R+fZbvKONryFMkHun2DrHOIx1wvQi+EMjcBcJoDioTqshsMeL2KWh+ld6xluDpmoA7J5nDEF/+FSy/7Jc+8+go1XRSTlhnS4eeQYUjIFkLg1Vdf5eSTTuYrn9qPLTbZAl8L9FpA1PqGUFG5f2v7tmUTgC1OGsU5y4Tc2ki0ixQPXoEUUw/ajVj3ivdZ7qcPQl+pglCeq5R/GGfN4mc1MbK2Tg476guc/cPv8dKsZ6hZDQsueqdDLjw1Fg0nWwiBWq3GZZddxpyF8zn7lp8itYJMEsSDSBkyuRZznTpAZvAh4FQJZoTgef3VF6m2zGPUqAC9BhbHcsiKKhX1Y+AnS9m7+oNR/tHAWIAkKI6UIlR5vcvTlbWSVdtwuLK+0YYFafSqfN57vPeYGeoU72LsGCGQiIuRHlI/ubU/XjAI3pMXBb+680ruf+g7nD7xXbhkQZkLk5TE9sgaDNyX3aLvQQGceahlzJ09jknnTOUzX5jEBz/4YdI8xyUOcRtWlG/DLVu9CmEIARXBmcVCeyJI7PD6UvX6M8hXMV5axuaY1cdESQz7oSD4Hn575408/ODlnH7yDrRncxAp+kPgZOAx3nK/HTdV4oNSSjXqhJo5/r4w4eyzH+IL+01ml90/jHlD03oBiSbZ1ilEBOcczpVxaH0flD+XEk7XbBjtC48PvYgKgvGbu27iN388n4mnb0/nRgsQKVPyzPoHW31YQ3NaDtx8ffNCmDu/ndMnvsBhXziT/73bxxGt/1m2xtc2kjHEM8UruOFr+R1YUAoKXNZNyB233ngD99x/PpPPfhvVljf6iQaDNIUUx30EQTQgGHlw/H12O5MmTeOw/Sexx84fw0KCEkBqUJaD2NCw3oUlmBohKKGWctvNP+fhP1/C6WdOoJLOJzFj5SWa1/B49cIxEoMEfFDmzOlg4pnTOWj/Keyx60djYRpnIEUsHbGGPfZIx3pBthBC36yEYUgI/PauO7nv/u/zzTPH09mxEMfSXupgwQIUhaFqBC8sWjCWiaf+lQMPPY/d9vhXBIXEIxJDqVZdk3z9xnpBNjPrczyKvItf3XYtf7j3IiZOnkBH+yJckFJoGHzHWwBU8DgWLBzF1058hqOOvJgP7PYveAuEpBfwpSTikLLIzYbIt/WCbCKxXFZRFNx6y9U88eh3OW3idrS2LIolRSX6uZRZ8oP6PQtIUF6f2ckZZ03j8C9dzM47/z+EHMFj5S0WyqRmFPrmRzcsrW1Eks0sYBYAF8US81jo5de/up4///lyTjl1W9raF+PUorwh5ayCxRKnb9kxqMsbUsobZd0R5wRfKPPmd3LWmc9wwAHnsOvu/1z+vSdRRyABXDmrUD9u2CDj20Yk2QAKb/jQgzpFA/z69uu5556LOGXitowetXCAdjfQhtiaWbWB4UkCPkRr6XNlwfxRnHzKdA49+Ax23+2j8Ziao6UViz6n1P8rseF5ojBSyWYxtMclPeCVm667noce+y6nfGsb2toXLS1vsHRk7RpBiETzimgUo2temfV6J1POnsbhB53Brrt8LI7HMMDHY5msxBnY8KwajNBBg0ns00Ktyi03/oKHHvkeJ5+2FW2ti9DgB72L6ptCK2PDCy/MmdvGmWe/wL77ncvuu30KrFr2tPVprw3TCVgVRoxl895TFAXOuZh5HgruuuMW7r3/Yk4/a3va2xeSirEyW7I2MIzCG6pC8LBo4SgmnvYcBx16Lrvs8mFQxblQ1oHzCI6AWyfnMpIxYshmZjjnYki57+G2m3/GPQ98n29NnkB7KW+IgayDpFIxcE7JvTB7bhsTT3uOww6Zwi67fpigitcaikexOLFPyuDLxyMfI4ZsItIXMXLzzVfz6GOXcPI3tyPNFiHBYuXv0ltcI49zVTCwXJg1axSTznmeAw6ewq67fwQLBWqBgiQSKwj0lcDfQKcJVoFhSzYrk0ssOEQpa9rWuOs313P/Q9/lzDO2oa1tMYLhFNY4aqP/gEvLGyGWg1AHhmP23HYmT5rGvvuewx4f/AgBKWckYuEb6atqWY9VqbuwG6bnuSIMW7Jh4L0RQi/m40T37bddyx8evJgzzprAqNaFUUNbYYzIGhCuLwOrX94wBAplzpw2vn7aixx52CR23e2jmCgiOSqOvuUTB6jFAriR6XutUwxbshlKgUeTHiwXfnnTTTzy+KWceurWtKQLB18TFQZEb0QxuFYIr81sY8pZz3LkoZPZ5X0fwbxDNcRcAoklvZqjs9XD8H38JBDECEXGL2+5nvv/dCFf/frmjO7oQi2sMoR7TdAvb0QT54Mwb8Eozpw8nX33P4ddd/5PROsJMaE/qrfJs9XGsLJsdXlDVWNOQMi57ZYbuO+BbzNpyg60VhbGos66DqI3DHwRo4ZDUBa+MY5Tvvo0R3zpYnbZ9Z/LXjLKG4InTpXFhcSao7LVw7AiG0CSJDFb3hfccctPePChy/j6adtQrb4RC88EjeLqIKPuwRZBmTWnnW+d9hRfPPI7fOAD/0SQgNdiOXmjadbeGoYd2YqiwMy45eZrePThH3LyKdvR1r4QQkAkJsiADH7pDwEJwqyZHZwxeToHHHIuH9jtn8B6cCLkZHFsFmBpeWPDi95YUwwp2cw8BI9ZWlY0itESt99xNffcfyFTJu9ApXURYCS6/Bf6lkdtA1YwtnIN9OADTgUfHLPnd3LWpGkcfOAUdtvjw8SxmSAkJChqacnwZeWNJlYHQ2zZFO89QXqwcqL7tl9ey/1//h4TJ/0DLW1vLCdv9FNuVV/ym9i8Mtcu+ICJUBTK7DlVvjHxBY486Ex22/XfERTTGqHMF3Cw3OS+NC3aW8KQJ7wU4hDtAlNuveV6HnnsEr76tS3paF00KGsaLIt6mVKxgKrQncP8uR1MOmMahx9wJrvu/DHMp4irVyqKodzN8dnao+FkG5gTbWZ4DC1auf2WK7nvgYuZOGk8ba1LkFXOLq5Z19VfeSs6GEUBbywYzWnfeo7DDvovdv/AR2K+qViZL9A/sd+k2tLf3ZthRSX6h4RstVqtjN5Q1Htuu+UXPPDghUw6dwdaKm/0FbSylc5xvlk3ubIPYtSGEeWNeXPG8M1Tn+fIL36H9+/8f8tFbAtEPCahP2egGS40KBgSsjnnCCEgFPzq1mt45JFLOHXiDlQqC9AgiCnmPOVE5aChNGgES5g5u50zv/UchxzybXZ+3z/FBGLNid2mISTQlDcGFQ0hm2FlprugZZEX7z133H4DD9zzfU49Y3taWmZHwVYELwam6+BrNgjCnDmjmHjGsxxwwLnssvs/I9aLGnirxEG/UJbTkhheTjlPuqERzwYUv5C+OIVVPP/9n8iA//e914jCMmZGwOPM0SsQaoGbb7ye0y87nm986UOkyUxUunFaJpMgYAkq9fpsA0udrgrlJa6EE0KOmvKDH/6Nd+/yef7X+z9K8N1k0gW+ikiKmGESp9KFQGI9CFBIZVDuxUiCGCTe8CjBCUhA+0q1OoIl0YmTANSoVpUPfWgP2qpVMm1ZzltvYDcawBxeAj2555pbbkD+eRSHLni0f32BdY1C2Pa1Nl5+eC5PdT3DDa9tj0g7NV1Cb9JKiHXLMRxeo2XT0IsGQ8vI2w0KsYOh0KR8jgs01Ii/pKRiZLXFjM7ns/i5x9l1+0350O7/iLoUsuXHuQ0jmwB4SCzgnOE7PaP/dUvCe5csHfJVN0srMmUrM1kDHYlVmUBTFj1b5UOPTiDzs3m+0kXY4TP4agtePc5D3QNFHSau3GWs7bZMpzBwx6vx/rrcZnX391a3EXxaypJmaAiIF8QchtLdWiP0zOGNqffw7ncIF555PKMrLZiFFT6YDRqzQUBRhEQMlYKirWB6pQsSWclZvAUrYgP/dhWeowW63ALGVeZy4b+N55ibLuJBgHftS1qMxsoqQ4RAEjxGwGuGqRKcreKUVvbBqq5hMLdZR+dgsYdUq6FWAAlGBZEEDZ5Ri+ZjT/+J9/pZ/OScExldzSn0DWpJQgttLDvqboxlKwv9IFF/UQKF1lhQKSM41jY4bXU3N4AMvLBxsoApn9uEI266jGe0HXvbp+l2raAJloAVORpqiHmwBLENcx2qvpB7lKBpGXpfUM3foOXJO9kxmccPzjyWUWkvoh5LUrys+F41hGxisXyt09IjDYLzQmpGb4OHQa1eSSyAK9icXi79+MYcf9PFTM0XEN7zSbqSzRFtoUg86mtRb7MqLqwL73h4w4jfmxHvg0mCOci6X8NP+z3bp69y4dkn09pSAUnjTLI5srpHvwwaZtkCRqGQEMOE0kLo9DDbBldLWyUC5OrpbgkEoNoN4ytdXPSpNr5y42U86hz6rk/TlaSIOGLRvrjCjN9Qp0G1Pgx2aFCyni6Sv/6JnXumc8X5p9KSOXyoUUsSnIAzIwlhhT1WwxyE+hIVED0cr3F1l4YGTSh0lYc0A5xA8GyV9PLtz2zG0df9kKd7M3j/3iypjkLzCllweAOfDdhPWbVSQ1zLIOgI7mINEg9ewJyUb9XnhKHSW5BXK3g8rb1vkD7+W3Zzr/Hdc77JRlUXp43VxWlHqU/trXjmpzHPq0SHsz7GNjVMoVfLM2hUc/HJywrBYYgzUoHUjHG6mMl7bcJOr15OZeoNtHQvwmdQOB9DxS0Hq2FWgFk9XaGv+tXIbUbQHNNYWcksoFagFjP7i0pCKHIqoYcw9W7eK8/xvclfpH2Uw9IEXAqS4CRFKRf21fqE49LYUDuH5ZCGwA7pG1z08Yz3Tfs+7Y/eSltPF4ULFEmBWo5agbMcsTwSTlOCDLv407cEE8jTgHc1vPQg9KDBcCFFQ0ruoOJ7aHvkj+zSPYOrLvgao9uNVIpVy0wrQJNsJZxAmnu2lhrn7dPJO16aQtvjN9GaL8QnOV6rBNdC0AwIpRTAeiH0qqVg4KzAnFC4hMI5ghiVfAHp1N+zc/ECV577JVqyHEGQPHnL194kWx0hjjPyDDbOuvj2pzfm7c+fS+Uv19LasygmTDvFXEIQV1q39WANeBOkcKRFhlqKBYelcSCX2QJaH7+LD+RPc+mUw+noDBRpiiWtOM0Q0Vh3pWxvhibZSpgIXoVcjbSArejm/L072PH5S+l48jrair9jtd4YWl7etjVZpGO4Ik5BR+lCEapLZpFM/TXv6ZnOT877CqPaDFMtqzUJ5gLLrRT9JtggybbcLTIgAUmNtl6lWoMsGOOrBRftvSk7Tf8e2VM30V7MjFUu63sw6dt82RbLOQwjMpYntvR5WgwUVaPQnCA5JgWVriWkU+/hg/nLXHHhqVRbFENwvkqlUJx5crcYk7eW5bbBkc1LP0H6YXGB2iJqQVJ6r0nh2U4WcOHem/DOaZdRfeJWqsUCQhLwkpEEh5SrbPTPmJWRJ1ZD4nqWQw8DF6ws5Vv3Qa0kV46rLYbEUVSUzM+j8pfb2IUZXDTpeDpbUlKXkiSt0cusC/P1bLO3gA2ObGEFN0iI6oZQvlBAY7pghmdr6WbKXpux44wf0PbkrbR35ViieMrF1ayGhFo5hqvLIv0T+UMPI0hBKIsZmnk0FLhgaBCsWsV6C1p6enFTH+Dd/kUuP+dYRncmOCXWNFGHJFHDEnUkVJcLIXozbHBkWxOkoeBt6QIu/VQb7/nrebQ+eh0dPT34qlFUfKlLRXlErFbKItGRGA4wgTwJeNeLl26EXoRS3rCUQqFi3bQ/cR97dM/gFxeeTGeLJ5ViUH3tJtlWAwK47oJNrZsL9hvLO1++gOyR66j2LCAQZRGf1GURG5ayiFqKhjjeMid4jfKGqZHW5pE99Ufe71/k8slHUK0UIIr6rG/t1EE5h0Hb0/qMENeqLyowJl3M+Xu28+4Z55E9cS1teXcZT6dYkmBEWUTK1QGHBUwQ70h8KW+QxBkD50lqs2l78re8v/ZXLj/ncDbaSMhVsaQVlcHNwWiSbXVQyiKFQJYb20gXF+zTyXte/AFtj15Ne/4aFD19Wl3EMPJE+1DmggRFRaksmUky9S7eX3uBay48iY4Wj4mCVQDBnC+LZQ8OmmRbHTjDuUBbTclywwlsltQ4b89N2emlH5D89SbaarOIK7rUhZEhkEXeRN7wWuClAAqyniVkT93Hh+TvXHLuySQpmMaus1I4nAVyt6QsSj04aJJtNaFGnLwvK9pUcs8EmcvFe43hXc/+iMpfbiOtzSNUICRZXILclpFF+kLXewZfFjFwfll5IywtbzghpI7MFlD9nzvYVV7kwjOOZkxHtU/eEJdEeUMEtwYe56rQJNtbQSmLiAiulEW2kC7O3nMTdnzp+3RO/SWtb/RgTglqMVTHamjojbJIX7RIig3yBL4RLVdQH6NV8bgQ8yr65I080JLXcE/cy3tq07l88vGM6kz75Q1xSKJR3hDFkTXJNpxQsYIdk/lctmcn/+vp82h78mbal3RjiRISQ82XlTJjiBJmiKaDr8EJ+MTK6I0uoAcwnMXojcIJqXXT8ue72b17Bled/1U6Wj2pLJvIs+7QJNtaQjDSWmAz6+bcz49hpxfPpfLYDbT6JRA8wVXxSRWTLEbyW1EGJ66Dc7EUCQnOAqaKd47CCcEFqvkCsql3s7u+wqVnHUZ7awBRpEgH9PPrFk2yrS28EFSpVWBs0sVFe3bw7hf+i8pjP6e16I4rCIpgiRsgi6wDspkgXkl9goYMsyS6KkkgzeeSPnoH78+f4ftnH87YTVJy5wiuJUZvNMi2Ncm2thAhlOHtLTlsm3Rz0edH8Z4XvkvLo1fQmb8KRS1W32qILBJ9UDFF1dGyZCbZX37FHu51rj7/ZDrbDEMRqyIIlvi3PKG+pmgI2WzgqzIBIA6eG3H0FZ9NnzSwthKEM5wGWnqVpAANxljp4bw9x7HjSz9Cp95Ia20WMdO+f93Tpc5hQHtTWaQub/RJHNYnb5jG2r9ec5CCSu8S3NT7+CAzufiM40gr9bUdMrI8ZpnluoQwiPLGqtAQsi0pY//FaoiXuHJe2k27KXhrKOnaNMep4UXpUYlJN4S10r4EULW+aJEWH9iG+VEWmX4FLU/dQZLPwxJPcBmaG1on3ABZxDDEemK+w4pg4DyIL6UNAcMTKDDxZHk3mkJwKWlYQGXqbewSnufCM49h7KhWsiTDJa1okvSFtzha+lZFXddoCNlSi964CQQn5Cr0iJHVKvHNgc1LTOzxlK9X1Ijd0opMQ1jFdoVQ8wk5YCFQ8UZiRihJt1acHyCLqEAmga1cD2fvNZa3T7+QUU/eStviPI7fMimlkF409PQl0cQueeWeqmF4F/CJx9RjlqOhIAmG80pRreJ7jJZaD9nj9/Ke/CWuuBdyXA4AAA5BSURBVOAkxoxKUQEVjdG1TgZoaemgyhurQkOyNapxgXa8KgWQuwQpqox/o41Z83JqSfk1i8QVrT1kJhTlPVh2ROEs7g+EgR1AWZmjb4pl4HYKVAvHu+a2k+ZC6hQtDBEoNP6tG+SBchZydpD5fG/P0Zxw3bd5Ik/gfXvR1dYKeQ1XWlKN9MdIQNOVW1gBL3EtBrM8isykZcFCR2E5Fe2l+sjd7GavcMm5J9Ce1Qix8MWgXtuaoHFJyqqYKM4LVXNsXhvDvWf9gS0rBVUPkgd8EpOBNcRcxlU+cCvjxSrMUxCo1YyNnaPbClIXn2m1cmGXQXbKBCPzsLnr4ZzPjuIr113AX80Iu3yS7rQVTxofMF+usWAFQdJVnEYM28ZiDq6pi6UOgqDOU/UL0Cfv4QP+RS45+whGd0IIggsVRHTI12xrTH02H8hVcAZagAXPq6/P4OQDD2DXeXN5hyVskhtCTm9imDnSIEifbVrmFM3RX1R52Uo8pWkstxOpl00QehJ4Ec9rnQs46KgtqeY1XBHzRiXUdzmIjCuide6uxHOc09XCSbcs5rEJR9L93s/R5TogjZZMihy1GK4ky5VkKa/GABPUPFDgnQNVkIJqzzyyJ3/Nu2ozuO47p1BNa+RpglqVLC+JtqGQrdcpmQfNC3wS8AEWTX+Niw7ah/fMXsSHQsbGvoZpEQfCyxFpDY89YBeFKM8B9285j72+uAUdvQVJUER8v2UbRLKZF3KF3tRoyaP1nEGVE2/q5snxB+B33puFyWaYZkiIhWyCVlhZh95PtgLBU2iKOqHa/Xf0f37NB93rXD75K3S0RG0vaAsgOAtlBtTQKl2NObr1y4Ymnm4tWJRCy7ZbcNBVP2Tq2A6e9t30OEENkjJsWS2gZYG+/ubLZX1CXNpnQFOsb5v6dg6Pk4CTQIIHyalJIDUhzQUtYviQVykrTg4inJFgtPU4nI8ezOYu57y9xrLDy1cQnvgFLb0zEavLIvU89QGPWb9GAxIwLShcTuEKwFPp7UKn3scHZSYXn3E8WUUIokiRkZbyRqFLCDL0aYeNIZuLJVpEQdKUFq3SKSnVSspW2+zEkVf/hDs27+BPDrpR8J6QeLBIIdBy7YI4+M8HrF01sJRAfKP/HUHK7JX4uyvre/SKknpBXMBSTxIMXUcGXgRUPeIEEciCZzzz+d6nRrHz9J/S9j934PI5hBTMVXBFQC30edYSBAl1iaOHNF+Cw/CZIwlzaXnqVnbz0/jeOV9h7Oh2qmkVp1Uk7Zc3ElrRYeAgNIRs9XVf48LDikOjwy0xImGjbbfja7+4hns2auVBPEuyDMkFU8OLlR5Y3IGY4N60LurKK1tIme0pxC9/2Vodg3rd9X2WfK/LIk4Cm2s3U/YZx07TL2Cjv9xO++IaQY0iU9QrLkCQQJEWFGmOiZGEBF+pYpLSuqSXlqkP8O7iZX54/tfoqAL0d5ei/fKGkjRM3lgVhvgMDHEFSEJ16+047GdXct9mY3jYoCupYoCalRJBtGZiioZ6iciRiyqebfw8vr/Xxrxz2gVUH7+e9p7eWOGpXAzOnCe4HoLLY9i5ZXhNSHwX7X/5I3vUZvCjScfQ2RJIxA/6GqyDjSElW5xmCVGUDI6OHXbk8Kuu5A9jO7k/Ebo0PpHiDQnluKas5D2SIRYDKzOFTaSbKft08K6XL6D62PVktYV4LSgSQ3BokaB59L5DCtXiDdKpv+N9+fNcfvaRjB4lmChqVdSG930ZWssmApqQkNASlKooHdtvz9E3XMPvxrbxZ4O5pJi5OJ0jsVu19WApKQlKEYTuirFZ1s1Fe7bxzumTaJt6LWk+F6wLLSDzGWmvkvoaSTGb9LHb2bn7KX568TF0dEKeOAqtIqy4TNVwwhB3owKkoBJrpYWCKtC59TYce9XP+P0WG3GP8yysZmUnaqX2Nowyl9YQceoujllbcmNL6eG8fcfxzucuoe3JnzOq51VSqVGYIInQ0TuL5NFb2SN5nSvOPYlqWhAMEquiCMEVmA7v+zK0ZDNBTfBqeJdj0kvia7gcxmw9gX2v/BGPju3gibyb7iSeapzQr0+M1vdT/3Wp+IlhCxOwJM7Ltvc4Eh8rc25CD+fvvQlvf+Fq0qm/xnpmY1XBkh56n76H/2Ov892Jx9DS7ggIGiokuZIEo9CuMpll+GJIySbl/+IkcYLTFiSp4ioZlTRlu+125LgbruX2zTbifhw9VsWb0VsWoouBGi7OKBgYgaJB4TJrC6lXeVCPqOBU6PSBCWEel+3peNdLF9L59C1sNP8F0sdv4X1M44qLvsHGHRnVVFFNkdRBEuvXJrThGN7lVod4zFaXRWKpEqlHJZQSgZrRvuWWnHj1z/jzuDE8aDndLiULGmtWSHQw6iugCYKzoXfx3wxLSS0Dxp8qkIixKTmTPj2B7Wdchrt7Eru7mVwy+TQq2ou6opSRSs2mT95ww0LeWBWG8dnFxTnMHG0T3sb+P/kx92wxlkcQFmmGifTNGEBZFSY4ZITLImKQWmA7m8d3PtnJPy7+HQfutgWbZllMgh7m8saqMGzJFpNCApVSxB29404cedWV3D22k/tTYTGChTI2KIQBqvHwdv/fDAagRtU8E4puJn1qPPdedSb3/uZaRNswKnExuWXaSMCwJRuimCY4c7RY7CRaJ0zgqGuv5L5xo3gEmKsO69NB4qrMUcQa4nNfGwh4F/MaFGHjtJcjPzGOm39wCn/49S0E7/FFHJeG0JjcgcHC8CWbCUoaKytrIDNPVWDMNhP40k+u4A9bbMz9ibGoEpfZNgyRcl33kfGgrxTOR7ueO0g0Z7xbzIkf34o7L/06v//VTTGi12y16tgOJwxbsgmChCiL5C7H6CH1Oa4QxoyfwP5XRVnkL76XJaUsotTJtkxegw1MDRneEIvamzPwaYwkTnsLtpbFfPk/N+XGH57Ff//69jh0QMprDaVnXp/WG54S0LAlGwAKKkIiKYm2oEkVV0mpVCpsPX4njr3pem4ZN5p7g9AtGT4EilLYDEBRBh/F3+O/YY/Sw1SBalGOCFLBqWe8W8hpH2njdxcey3133orlBoWHopvcF+X11RM4mmRbfZTaQLz3Wrr1USspvw9aN9ucE6/6KY9tMZYHraA7yVAfZREvgSABTwAR1HREyCJA33XLgN8RcGJskvbw5b3Gc+vlp/Hfd91ATQxzKSk13DAvlT9C7v7SMEIpiyS07/B2DvjpFfx+3GgeRVjsMkxiKFeMUK3nakbxd2SNcpaHSmDzbAnHfHxTbrv8m9z9u5vpCZ44YTy8LNmyGKFki15nlbiUZOfbduSYG6/jd+NGc6+DxSSA4grQEMr04Lo9HNnIMZwFxrOAUz42ljsu/gb33/VLCh/XbA/BCCEQQhh2ssjIvPsimCRoUFpMSQyqW2/NkT/7EQ9tPoaHCczVDNO4rrtJIEgpi4xweHGYCc6MTXUxJ/3nFtxx6encc+eNBN+LD75cZnz4jU9HJNnENIY5O8AFMiuoAOO234Ev/vjH/Haz0dwnBW9kKV7K2hcSYF0UdGkwqkXAIfhEwAU2zRZx3H+M5bc/PpW7f3VzfyTyMJRFRibZSlmkUMhdTrBeUl8guTJ6/HYcddPPeWzTTh7x3SxKNMoJ5svk3tDvp5UqQT1gZEUJ9sOpUY9aNqMrUboSAQlskS7i6I+P4eYfT+I3d96E+YJghsdHH3yYzHKNSLIBoOVKemQk2oK4DJclVLKMzTbdiqOuuZK7txzHw97RSyVGhCS+nGxQClHMR2nEC+BZ4TTQsGoQL1qg1QdafEzmTnxgnOvmK//Rwd3fP5k/3XkHEpScnF56KWLC/ZBjZJKtTxbp/9enF1jAiTJq/DYc/aMf8PDmG/OgeLpdhuYJWrRRCTFbCwfdmbGkIviEeuzJsG4SYgygM8GVr9WEJMC2VuO4j27NHZd+iz/cfiOuSKiGKlkIwyI/YejzuwYbEpf4sZDRvsM7OOSqK7n4s5+FmfN5b5ZQyGJarEYmNXAxcTgYeJWRIPnSF+GygrddrWDTzkUcsk+Fi37yNUzgHz+6F5J1kUgFpdLwsx2IkWnZ3hRCFSExpbrtBI674ef8cYsx/HdSMKclVoC0XBBvtPQIHd1Cmmv/slXDuVmshbKiZk7Q3LOl1Tj5Y5vxm0tO4cG7bqXHMnJzFEWB956iGBrxtyHlFxqJQBzfuFwxoMsFgnjmP/sU3zniSDaeNQtG93LEEVvRGrpIPIhYTIIOq/Dg1qCQzZtidfe53N/Zcn9nQC01nBeSmhAE5iQZ/3X7fP71wHP5p49+AnH9k/dJ0vhObb0jm/W5b3EFuqKsaYsPzH35Ob6x375YsYDPf34rkmIhcZmmWozptxUXdCmzmldywJV/JgP+v/x5riIUauA+l31tS2dR1cljRM/cFVmse6dd9LR4Xq+N5Zrb53LkN87hXz78b6gqzrkhkUbWO7LVdYJCCoL42PXUQMkIFMydPYurL7saTRdDYaQhwzByBa9hJeOhNyPGSj58s1u7Ovtc9tjGMuK09L3vyuyzoEZhgroUy2N5pu3e8XY+/slP4lwMLq3/bCTWT7LBUmsuxZfC0v1T/bUu/d7w00JXD30hRv3X0Be8wPKWdCgs23rojdZ/yHLvLc2kFd3skco0VnyNw2wWYf2zbE0MW6yn0kcTwxFNsjXRMDTJ1kTD0CRbEw1Dk2xNNAxNsjXRMDTJ1kTD0CRbEw1Dk2xNNAxNsjXRMDTJ1kTD0CRbEw1Dk2xNNAxNsjXRMDTJ1kTD0CRbEw1Dk2xNNAxNsjXRMDTJ1kTD0CRbEw1Dk2xNNAxNsjXRMDTJ1kTD0CRbEw1Dk2xNNAxNsjXRMDTJ1kTD0CRbEw1Dk2xNNAz/H6rER7XAQMq5AAAAAElFTkSuQmCC)
MathematicsGrade-1
Mathematics
A triangle has _____ vertices.
A triangle has _____ vertices.
MathematicsGrade-1
Mathematics
A Pentagon has _____ sides.
A Pentagon has _____ sides.
MathematicsGrade-1
Mathematics
Name the shape given below:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIEAAACKCAYAAACNZymTAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACavSURBVHhe7X0JfFXVtf5lCCAgIIgMiiJgFURRUeuAA9qqgHNVBBxwBJFMNwNJCAkEcdaiVm1fq7YOtSrOWifUPhUhIfNIIGQCHOrfqs+/IhD43vetfc7NBdPfTwq+xHjWZd2zzz7n3rv3Wt9e0znhhNDeaNs2j9XWv21owlZs4XsTNltrK1/q1z92grvWVK/teGznRLj9UvsDga9DkelOyhQEBIDN3N/C/Wb1RgNGHxMmrN8n73B7pnZoCTwWWVtvTWz6S5777p+13ctHjlqCjDvbyL7DNdsrtTsQOJ05rZn+rUH29Owv/B2pGQhyFlsJgmh30L6p/YFgG1c9ees2Gv+tWtVO8djitC+H4FP5qko8/sSjaNoc1dvEk8xoEAL6Hn7CfUv7pXYGAilaANhMAGwx9TXJ5G8lMJqaFf2vL/6FmxflYODggQiFQjjlhJPx9lvvRNb8VlkMgmArG7IHem/P1A4tAVVG9s25VrOBQ+8Ew9+eeBIHDTsQoW7dcOyU6bgk53b0PfQogqETpky9DCXFxXauT/p4xK20U2qXMYHW7TYtZ7FHr7+9FONOOpXKjsEvTj4D1/7pr8gp/xjZVR8jbUUxJqZnoUO/fbB3v35ITU3GRx997H2SJBfRjqkdWgKv4dHK/HxMv/xyW+l9ho3E1Hv/C9mFNcgu24CklbVIWLkaScVrkFlVh6R3luHEq2aiY/deGLzPINz/u/vx1ddfed/UfqkVQSBtOfZftt/cbeRtTLmmYI/tEzT7/r6xezP65J+fIiM9DT177YmYfQbizNRszF1WgnmV65FUWI9w7lokrqwhr0Fi/hokFNQgqaSW1qERs558FYeefbEB54gjx+D5Z5fQxbjvdrmDZ2HYFRmTNtyxpg6L/X63idCO+61NrQwCX1ou/HJtd8RnIzZM3xKygjzuqG2Bm6L4KLO/8duN+O1vF2OfAQz6evTECdfMROob7yG7vB7JpfW4Mb8G8VR8EjmByk+UJchz+4kr1yIufy3SKzdgQXEtpj/4CPY58hiEOnfCpEkT8d6yD7xf8Ug/28Q3uovI+IQKG6/XJundtZqppb7WotZ1B/9GCpKtkjJTrc7xBWwvKV4gcBxNS55+BuOOO94i/sMmnIsb//YScqrWI4UKTVxZTV6F+MJVmJ1fhdiCasSTE/JX0RKIq8irEU9gCAiJtAxzS2uQVVyBc29ahF5DhyMmpitmz07Ampq13i+SPG1K6UorlV+qNL2ZW9UpHbjV7208Vu/2o289avWYQIKIxO+egLSJVOxMhhLmFlttFu/ZCoucgWW5eTj77HPRoVMX9D/iKEz/08PIobKzStchnFdLxa41hcevrCQQKtlejdlU8o0FazBboCisJFcgtrDKrEO8uYm1SMgjF67B3MoGpLy7EmeE56Bzr97o070Hblu4CJ98+qn9vkajMTkroHFJ/c5tCLaRSdpc3PnitkKtCgIJQiveCjomHbJW0/ckJGFSsERBs+qBxro6XH/d1Yjp2gV7cKWet+AuZBWswtxyBnlm6msY+Mnsr+ZWK52WgBZBKz0uv459AsgaswoODKvYvxqJcg8Ej4sbCCBycmEjblr1EeJffgNHXHwJQp064NBRo/DIQ38y3fpk87C5uI2xDwKv2873j7UBanV3INlonZvZpL9HE5nKNrWbC3AnysT69Mknn+KWhTejb69+6NyjN06blYC0d5Zj/ipG/AUNVByVm7eaCqVSCyoNAEncD1O5CbIKjAsSCJDk3FpTttpxtA6xtAxxBE2YSk+iFQiLGTOEeb6+M5acXL4OmRW1uO6Jp7DfyUw5Y7pg/Kmn4u+vveGNziNf2z5zXxvNV1sviFCr1an1QKD5G/tSknho8rfRm27bwhbVzmPmaz1S8+GHH8GokaMQ6tgFYy+YhqSX/4EsKialWIqqpOJqjONpEeIKqoyl9HAerUMumYpVbBCWa5ByCYoEAwW3Eebn5RYIjDhah3h+h6yJMgkdDxfUI42uZi5dxbR7/4D+I0dbHDJt8jSUFJd6o/UUbvGLA7mDtnoV3DrotwVqdXdgADAgOL+/2Zhm3wBiJxgtfetdjDv+BJrhGAw56TRc/dizyGQ6l1y2DrG2umnyZe6pfPl2scx/2Iv642n+tZqTlA0QAAkFLgaI5flSthQsC2CxgNwIQeAUr+CRQCIQwtwmcV/WQWBIXFmHBRWfIvP9MkzMyEHn/gPRvUcPpCQnoXH9em/kAsHmCLsSpADuQsa2QK0GAgkgEgtwT95eEbUBIEr7RUWlmHLxFK60jhg0egwm33k/FlBxaeUNiC2qZYBHtsBPvlsR/yoqmNG+ZQNauVKmVjVNvVa2ZQU8hwBJoKtIzKf1oGVwypU1kRVwIBCALH2kK9F3JhAIyiLc9/M7aVUUW6QUN1oKmvL2Mhxz9bUI9eyJYQceiMW3343N333nzYRK37aJU6WNI8K30KxFGblWpVYFgQyjT+56XTOtb1iPOXMy0LtPH4T69sekOVnI+qAQC5jDW3HHW6kJ+VKq/D+V4vUr50+mSzBFqd9LBeOovNmF1eb7nZKrTfmyDlrdBhp+p2USsg52Dl2JXIC+i/0ORPo+l04KMHEcgziptAHZVfWIffoFjDzjHLqszhg75hgsef4FbPauVGr9m5FrIwAQtQ4ITApkIUEcJZDvNm7CA7+9H/sPHoJQt+444dqrkfjOe8isWofkIinD+fB4mWSZe67mMAO/sABBaxCXX0uWVWBwJ+ZKDudJaY5VHHLKJvN4vIJIbfWdBipZCcUAchNUuPU7N+EAISvhgGBg0Pd54/EtSFppHbLK1uKKh/6KIWNPsnjhnAmTsGzZh94sSb4MIrTdzv8p/QggcEg38idK9os9Rt6+wj+/4LO1aStefO4FHDlqDEIdOuGgSedj5jMv0efWIrWEkbmtOinOU6CxswQK9KRc9ekcWQW13UpWTBD9Gdcf2TelRu173+m20f1iBZJR+7IoBoLmvngCKK6wEnFFazC36mPMza3GhQvvQdchI9Czx56YefU1qN2h2GSFL9pBd8VT+65fC2T7yqMLL1004VhtF2q6j1i3O/0H0+4HgadsDU8v/RNv5QQ3K/JX7w4Dfe/dd3HhOefZitnvmHGY9uAjmE+zPa+swYo1LSukrbKskwLJ1YxVCLhiWoWqDch4Nx+n35CELnsPRL8+fZGzIAeff/ZPTwJOPpYxMGYwGUpmBEDTdiBw4bNbZmTrb4aEdbcJEJA0LBfeueFpgluY9m0iCBT4+VS3pg43XD8De+zRHTH77o8LbrodGTTvcyvWe6ZcJlYpnkx0SwJve6z0VC4ogdYpQRZBdQpajNTiBsxnPJPw8js44hIFuiEMO+AAPP7Yo/jmm289iUivkhflRHkpirAV7ulc7Dftzde+3xk5uHO020EQwWVk5AIEIREVCn/xr8+5EhZwRfRDlz57Y3xsKlLey0e6yrOFEiJNvABQUMMgTj75+8Juq6wytTixUHEG4xWCONliCcYqdEupFXW0cKsx/bG/YfgpvzYwnHLKeLz0yiuedJziNymN5NZWfeSWN7IvRifaqL7ojp2jHwEE3mAEAvtnIzTa9N0m/OXhP+MXI4Zbyjd28nTEvfAmblq1Hsm6yMMATD5cgVyYq1++Vv5cgVdLAm+TrBiD1iCBAaq1o2IVlaeVXSTSMmSUrMNCprhTFj+IfqMORYdOnXHpRRehvLTMk5ZEKDk2y7Il1sapXpJ2rZ2lHwEEZH/QUfTGa6/jjNNPt6Bvv3Gn4vrHliC7eB3mVDRSOPKhrgijur2Epjxf+0lW8//pxASxBK/SULXNIsgCEMSxXo0ikQBPVjk6l8eYzcylZchclo9J6dnoOmhfdOvcDanhVDTWNXqSk1rdFUn3FxOeaCMNv+lekc6doP8YBBbtR7FfHhUiXeDiqLJqFSZfcgk6xnRGn18cgivv+yPSma+nVK6nUOq5Uph+KR2T77dijHJ2ZwGcG/DTu+8LvC2yahE3WrVSyhYQ5BaYutKtaU6u+MR+zU9WglYhrDudqhqR9Ob7+NV1s2klu2DokANw112L8f+/+cbkKJeqsFqAUIwlebPhdO4bAG93Z2mXLIG7qcOZH7u5I2oI6xrXIz05Dd1j9kCPAYPw6/R5SF1WiExdiSusY+Qsn6+yricsE4hfiHEsEEiAVtvfQdhtlR2IZcW46jkHXZX0rYCrQXhzY5/qE1am1rzzKukiGpgSb8DMZ1/HiInMlmK6YuwRR+Kpp57xpOpoK4NG/VFdE8Fg2m8tEESvfrFP39Hv333bHRg+jH6ffu6Eq2cgZekyIn0DEV/P4EgK1eqgMAoqKKgqT2gCgnxolMIpoJ8eCLRVVuOU7+IAlZorjGXtdMzmZRezXBFK8VAsF4MsRnopM4mSWrsZdsDRv7TgccKvzsKKD3M9KdulNmyi5vUy6eutNUAQrXzRc8+9gKOPOgahLl0x4swJiHvuZWRX1CKFk3JVN0b+Zupd1c75escuCJTJpHB8MHj8kwoMye4ahQOBLJssgm8ZHADkCpy709wEAu0n6HyeY/czUA7zy9cha3kpLrrlbvQ8YBiDxxjMmDELVeWrPIlH1w3+cwpFfz76q9T+oV+dn1+A08cz6CNih/7yeFz5xz8jq3Q1ksvqbNJJnKTq82b2zCSybcpmcGTBk1O8M//N7PtQWYmWhN0WWcB2Vx5l8rV14PZTR2fdCBDGDYofnNVwbkKlb3d5WyCo5twZOxXWIrNyA1Le/xCnh5PQsddeGNB/ILLTs/BtdH3B19a/UaI7vl1HhELRvkRhh3ClHT8tFfmr3pl/r5NUXV2N2URmjPz+vsNwwcLbkZlXgezKdcyTXfnWV6Z4e4FplXurfrv+7dmCxBb6f3Jsc22erwOIrKCO+9tm9oNjtVVfSNb1iKoGxL36FkZfPBmhrntg5PBfMOV+zK63+LSN8YJchClUCiRLqy638MpP/jFPlxEQ2EYaVl7KIE+Bp13qFQD48gNA0ZdffoGF2VkYOGAAQr364vTEDMx5Lx9ZlQ0IM/f1L6QEvLtYV0lXMaWsRlpxLXJKGS888RxGME6Q9T3p+BPxxquvetqROrVYqTUqUX+GJ/W7Kwyu/CR9S/9i0XaWwDTv30JtHyamBAyPNm78Fk/89QkceMD+RGI3HH7hZCS/+jaDPiqfSFXE3/IkAt41llwJgtxVSF1ZR1dRh7l0EZlF1Zh274PoydS7U5duuPTiS1FWtn2xSfpr0gKWGn22jV6OIjGBbfQmUOjefl3IiKKXXn4Jp5w8zpA38pQzcc1fnmHQV0e/rzzfRffuVq2WJhHwrrJkm8hswq6p5LpgMsxUO6NiHdKWl+CM9Pl0yfujd6/eiE9ItBQ9QqZTqpf6lYqd+v1rOwKBdfgHyXyLXv3lRZWYNnmylTX3HDYaU+95BPMLdL18vVW/FNDEMc1zgU3LEwh419nFCM7NSs7JKktbIYpgKKrBgop6ZLybi+OvmU0rvSf69xuM++97AJ9/8YXp0XcGRrL4cvue7kOGBtO+28iH6AMbPlqPjLR09OzeG10GH4Az07KRubwMaRWNiGfEalfLcjU4mipVvQgCRbTtIohrc8wMQje8Frrik65N6IKUydrLuBKZXqaWNGJ+2TrMfOoVjD7nIlrtjjj6uF9iyZIlTrdSsxoEgQX6bIqiQGBvbkNKCMea6T/1qplIeWMFI34qv2QNbmRa43JZsgDgxQGuHOrSm+9PIuBdZRWdrO6g/UhGpYqrim3uYpvuqJpdsBbJFQ3IZop+3UOPoudBB2HAPgNRXVXpFGsgsH8GChHdAZumfx0he0cmT/kN+h82EjcVViKzZB1XuXJdrnYhjz8a/Qcblgbm1fF4PQcWZAY/BtstcNSB1VAoe7lf1SS08Nzio5WgruxiHM9NLqjFotWNOPeOO7DPfvuhYOVyp1i5Am/dCwgigsDrMTCQPRBceflU9Dv8MCq/AgkMQPTXOKk0/8kr3DVyu7WbbkD39KnoY4NRJXCHwQe8m5gAUN1AsYG4+Zhcg+Su29pUlq5EMnWVxEWZXlKHCbfdjcFDh6M43y85U9mmb5FrRECgWxjcPX/Wj6umTkXfUWOoWK70EmUA/PEVBAFRpsDEbu82V0C2QRCdBIYrBUcPMuBdZaucUsZO2XIJusNZVsGvsnp6oIVQtTKJqaT+siqjbAPOvOU+DN5/RAQElhnYPynaKkECgW1pANx9//qjCNFVU6ah/8gjkbKCIGD0aQGJVbzcyrcB2KVfd2FEJVD/Vu6Ady87EDgFyxXMLlSMIOU3s7MU7qacJFoFlZ8zSjfgrFvux6ADDkJRQZ7p1bTrgUCVIAOBU7neXcnYIQSYPm0q+tMSpOUy8LBbpTQg+XtyJDDxEEj2L4zsOIGAdw9Hl90jim+BncuQTtYQBA2YePM9BMGBBEG+6XV7croOueBA0FCHA4PoSoHg0MMJAsYABMGOPxZw22UfMHNL6zHp5sUEwdB/AwJHAQjaIQcgCDgAQcACgbuPYS5jggAEP1MOQBAwQeCygwAEP2MOYoKAAxAEHIAgYHIAgoADEAQcgCBgcgCCgAMQBCwQBBXDnz0HIAiYIPDLxoE7+NlyEBMEHIAg4AAEAZMDEAQcgCDgAAQBkwMQBEwQBHWCnz0HFcOAAxAEHLiDgMlBYBhwAIKAAxAETA5AEHAAgoADEARMDkAQMEEQ1Al+9hxUDAMOQBBwEBMETA5AEHAAgoADEARMDkAQcACCgAMQBEwOQBAwQRD8Z5Y/ew4qhgEHIAg4iAkCJgcgCHjnQSC1O/IBsCMI9CCs2u/9kM/RD2Xyfzzg3c+S7c7KVyCYuGgxBu9/IIrydwSBex6ayIHA3qR8PSDTHbj8ssnYe/RhSM3Vc3jrqWj3RDQ99UzPQHTBx2rEFejxbGu5rwcyatvygAL+z1nPpJRsnXz/zRNo1U8dSE8JYp6bWdpoINh3yAiUrHQgcNrVditf3iPx9BA80/82trY1eXaAluDyKeg/6nDMyaWyi/QcRB+NykHdI/D0eDwNSgCwZybaAFoYYMC7znoWJdkWXaGem1zNNhck9eE/p1oPMXf60FNT1yKdlmDC7XIHB9ESFDjFCgWevt3jcAkCPUXf7xQgNntQufqyy7D3yCNoCegOivRjejizQKAHZa611S/UCZ16LKuAoP4WJxDwLnNsQY09EDPOHo7pQKDF6ADgFqezztX2BFs9HDO9og6/vvVODBx6EAoLokAg3VPnEXewxV/73FeX5w1w1ZTLGBOMRWpeFZL442H7AQGglgMQ+w/M9C1E9EMzA96dHM8VryfQ6om0evClVnk4T8+nds+o1lPsBYzZhVXuPPtcDdJK12Di7XpWcrMlMB2TnR1wynaPzlePz94Dsy+fomclH4b5FTVIKVtnpsgNSs9Ido/N12BkASxWMGSu8s4JePcyXW+Bexi2ZB3OrUPyinqTvyyD2OlFMZvcAT9D4OTUrsfZdy3GgCHMDryYQIp3KtZ71LOStfq3yh1oKyCQrrnqaoS6dMW46+OR/k4R5pWvQ2LJGtxItNmDsfNoijgIsdp6WHOcHttuscKOkwh411gypXy5jdM+ZR42y+tbCOrDrHEd5V+LlNIaLCivwYzHnsago49Bv777oKzYWYItVL4cvz0hXywQNJsGxYpih5SGhnrE3TAbXbp0R7dBI3DBojuRnleCtFXMFIroo2wwtAYEQJg+SeZHfqvlSQS8qxxHFyzlJ1HOsrixhZUM2GmRCQxZZlmBVAbwCyrWYdYrr2P0pZchFNMTBw87BEuefBobv/2GenUvKT6aQm7f+QJlB2KhxaflHy7HxAkTEQqFMGTscZj+X48hnShLYtARz4AxjrFCHJUfxwEmEIX2QO0dJhDwrrEUrKA7bIE4Az+6hVha3dnsj6Xck4vq6LYbMOe/l+NXickI7dkbe+/dHzfddAu+/vobT5PSsHsgulTus8jcgQ6aiVA3fcM2+gT5Ds8zWN+zS57DcWOPRge6iBFnTMINT7+IrMoGJDMNkYlyT02Xb2p5IgHvGsvcx9Hy+rGXMoE4Lri5VRuQtaIckxfega6D9kVM166YNfMGVFdXe8oTyfyLXdNXtY8CugNXNrDH5ltwwF6PtzFIkGXwqWnLZiy+6y6MGDYcoc7dcPz0WQi/9h4WVjQiqYgBYmFgBX4sVnouKztbhbnCWqRT3otKazHtwUcw5NjjzVJPOOssLPvgA09b0jGdPPWneM/07SveUkDrMXLZgbHrtHe9+a6DH9DRZigAjY2NSE9NQVfGC136DsDE9AXIeL8I2fRHiQKCBSmMFVqYjNhZje/3C+1Wi2jh2E+bXWBnEbyt5J0JnpsXVjxN/5ySRmSXNWDW03/HqLN/w+C9G4444nA88/yznnYc2eKW7qhD6c7XsPpd1Ocr2HMHP4TcF4j1dY7KyypwxRXTDYX9Dx6JabfeiSxGphl0ESlUZpJFsLQQ3Fq5mWmLyyKY06rwoQnyuKtwKduoNnY1CQcUVwb9KVkYf05kthW4JeZXkZXiVTCg01Zz9MGu8yUfztWrByRSNloQyrzCKhXznDAXV2ZVA1Le/hAnXjkToU7dMXT/A3Hvfb/D199t9DRC/TQ5xUZTyz3NvT8YBCLnNHzL0UwvvvY6TjptPEIdO2LIuPGY9egS5BTXIq20EbEqZjCYSaAgBADFDWEVmjhJZRMKKiU8P8pVwBOrNJRtq4ZZNfKnAwIpU5U9KVcKTM6VMp0l0DWXJKXWXnlX51ilj/0RK8HPxgsE+p5cyqFwDTJXf4S5y4twVloWug8cgj269UJqejrq6+o9DVCl1Kncubn0naSdBoGrMhEE+jHZGu83N27ZgkceewyHjBxpluHIi6ci4YWlyGG8kExAaGIKbCyfVZ1bArMcV8Bwq1518RsLVxMEOs8vibp2SwJvi6y5uKodx00QJOW6yl7iSrdN9vZVfFNhx7kJFdloAUwOriwfT78/t7wBOczALrjzPvQ+9DB07NQZUy+egqqKVU7oJIvZpHy2pQ5fHztDOwkC35MIBGypsqROsUeffvYZbr/tVvTp1RMxffbC+FkJSPlHPrLKP0JKQQMSVFiiklVwCucz16WFcGBgn0woBaSLJWYiBRCmQz+lSqQUGV5J80+XJoXKnck1mFnnVn7dWUCBnkrX6peV4PlaIJJBeikjfvr+Gx5/EcPHnc5F1QGnjx+PpUvf9qQs2sLAfXMkkxObNTAk7BztEggMhVvF/GF1RZmi1bU1uG7G9diz557ofsAInJt9KzJyK+nX1jN4VIFJplHmUIoWECQ4rf46Hqs3IAgY8qPmSloQeFtkxTbJyuU5L13kmc25ysq5GEBWwtX53ZwFbhcL6XhSUT3mV32M+BffwbEXTTOLeigt60MPP4RNmzaZXDeTzRprAXr+X3qRlZb81d5Z+mEg8HSrjWPnGPyft14DgN/XTMuXL8c5551jExpw1FhM//0jyKafy6BliMuvp+IFBAVDMqFV5iaScmvMjGrlKNNoSdhtleXLXTonS7CKSq80hbtSu4sJBBCbMwGglZ9UXIcsZlYZ/1iJk25IRJd++6Bv372wICcHX37xL0+STsTSuyQdLXqfpRVVfO34TtBOgUDkfs+9XKCoHn9EJHeCkQ+HzU2b8fLLz+OYY8YaGEZNvBAzn37dSpxpjBfCiorzCAKtGlkECi8pdzUzDB5TPZymtCWBt0V2LkCsQLCSTEtGIMTJ5xMcKQx0k1bwPF3+5XnzytcjI68M5y26HXsw2u/eoztmzbgOdQ3NQZ9bYN7W2HbcNgoMruTnoradoR8OAp890u9q3bu1715G3qCax+qNkPQdTdo99z2AYUOGokOPXhg77Wqkvb2M8QJTSprCOAomloCw7EArh6tFN6ooxWxJ4G2RlfYqO3C+Xm5MLCvHeaisTlAncZtRug5ZxWtxzR8fx+AxR9niuOjC8/D+B++ZrHyygp35eclRV/2cQ3DK9oTsxEvyz9s5+oExQbMiffJ/2/9Zv73dgQhrIhq8doDPPvkMqckp6NO3LzrutQ/OnpODlA+KMLd6g6VIsgTKrd1VSec3WxJ4W2RX21Bbft9jjj+e8Y9M/5yiOiysasTMv72EURPOp/I74ogxY7FkybN081pSjmwRUbBiK/qYlAUCGXxd3dlircgnPDn/aCBw4YZYI3Oblsgdcq9mU+BoKwOZbZxkdBm6pKQY0690xaa9DhmNKXfdjxwqfV4pY4VCrigKU5dPf2og0Nb5fVkDBYY1SCmpN/eX+vr7OO7K6xDq2Qv77bcvHrj/d/juOxf0GUlmvqjJDgCUqO17nR5r451qbffWmiDw+tyQbdh+l5E3bvsWGbLooS5duhSnnXwyOnSKwQFMia79yxLklNYhvZgpZYFuW3OCVdAlP+qEvT0w/H6Xdzt2Obtbja7P1SmiP/eDWUFqZJ/f47UTVezid9q+tlb8UvDHNjOFMNvzK9djzvtFOGfuIoT2GoBeffogLTUFH328wZOA5BYlLTV9gZksvT5PBbb1meR3Rbd2hn6gO9j95OraNr0IPf74Exhz2GiEYrphzLkXI+H5t7CwYgNXEcFAISeRlYLZ9XNfuXIfjBlciVXHXLqp9CuWbLdckeVewrQyuhSr85WvO1AJTFHf54HFV7itbPtuBancmmKVzspN6VyBgMfo5+1OK42Bx3TdP4PjXlRWj9/ceg/6jzrMLN70yy9HQXGRN2NH20vhB5I+9B998PvUaiDQBBTwmN2Imszn/+8z3Hbrrdhrr34I9eiLs2anIOXdPMYL65hHUzkrK6l4bhV8eQqU2ZX51epzW0+Jln4SIFZ5FFicolWocWbbfd4HQfN3uZW8PQsACu5c4GpMsMldKeCLNVZByP0N4LyyGlz756cw7KTTEerYGcefeCJef+tNb5aOdpMOd5laFwRNhIBZBFkG1+fTmpoaxCUkoFPnzug5dAQmzb8VC1ZWWCk1sbAOcaYYmXetSOXjYqVlUqxb6eE8RuK5Yq/mQMX7VTp/G21VzHxzJbv6voAjAAlIzFqYvuozAo4ApCzA4hV9D78jdiUtDV1YNjOd1JffxegLpyLUuQtGHnIwHv3zX9DUFBX00WJbxB8139ak1gMBJaAg0a566R/Z5GIpZbPAVqxYjvPOnoROMV3Qd/TRmP6HvyKrsB6Z5RtshTofr+qcTL+/0rlazVfTRHt1el2Hn13YbD18xfusPn2fbzVc261+WY5ZtEKqAAp47g9BXLonMKbwdxdWrkXKPz7E+LhkdOjeC7179cMdt92OTz791E1ECufUNF2X3CnSb55na1Irg8ALYrTR6vCAsIUN3e/oHTV67tlnceKxvzS/eugZ5+O6J19BlgIuBo+6SpeoYpOtzEoqrYKs9NKt3FiyyrcCiayFzpeifTDoKl6zO/GBpa0qlrIgtCy24t0xq/rJWhTUYh7BmJlbhXOyFqH38BHo1i0GM2Zeh+o1q72Rk6hrWbwmWj53H6dem9n6mYNACo6UOL1Voq2AoN1Ilxoe/c9XX+EPf/g9BvTvj1C3Hhg3fQbCby4jGNYhpbiOCpKJZ9BGTsmVUpuDQyvdWs3BX/GK4ptjAFfOpZKpaDP3ftxAiyLXYsEhjwss+lw6zX5WcQ2u+9OTGDSG4OzcFWedcRbyC1Z6o/XIn5etfynewVszj5paq1KrgUAC0DowQejNtC+W1MTqi2a9Ofrkk4+QkTEHfffqjY6D9sMpyWnI/LAUWWWNdv1dqz/ZFKYKJFd/oYsbBAq7NM2V7a7nK6bwQeDOl+JVn4gtpM/XdykOELh4XOlfSslazC+vw8ynXsLIs84zy3TsMcfi+Wef80bXPGS/ofDXKX8z2zIL7Pem2BaoFd1BNEkqWimuGuZYEKGkrGSmAJJNnRZF5eVluGLqZHTo1Ak9hx+CS+/6PbKptLm0DLMVLGolR9iZfQOBp2zfEvjuwe9X2dduDKH7SGTAl0TwpBavQWZFLTOV5ThSxZ49emBQ/4H4/f0P4Muv/scbkUcap8faaGYq9AoM1iEAaNtGqHVB4AlKUtHLCcuxM5kCAlfQNvpQgsECx8gKijTw1ltLMf6kU2xVjjjpV7jiEQaPVVy1pQzaqNhkmn5V7aym761+AcCBgADgOdEgiFcAqViBvj6NAMhhRpL+QRF+nZKJ7oP3tSt8iUkJ2PDPf3oj4Lg4Nt3U6Rrs8PRt0xNF7TgLuN3RVqVWtgQSglshJhK+GUdWinfcAOB5UTvON7MOdpLR5k2b8MwzT+Og4QcyXtgDIyedh6S/v415FXUEQ4Pn1126J+X7dzVZWsg+sVkMAcX6q2j2G5iJrMHld/8RvYYMR0h39ky7DGWlJd6vOmqycjjHZW/ssHFpTs2qjgyVW9cXmWSrUyuCwIlC7AvL27VV9D0ZsW3ZRETQfrezGj598eXnuClnPgYPHIhQ774YF5eE8DvLmb83IrWw1uIBVyTyL0wpRiAQzD04SzCnrBY5pWsx45FnsP9pE2hhOmH8uJPw5hvbF3sMrWQD8Xbj8uek1w5TiTonqrdVqY3EBLuDqIrIcgNWr2ZqOOsGdOzYiSZ8f5x/0x2Yt6IC8xg8yh3IIoSV+nmK1/0Mc5hh5DDqT3h5KQ49/1JalO449OCD8cRjj2LLFuX1jqItUHugdgQCR6afKB3lFRRg4kSu5o4dMXjM0bj8wUeRVbQWqSXMJAgC/ccOqQV1mF+1AYnvrMBZ8SkIde2OQbQkOYsW4ptvmv+MS8r3AdCegNAOQUBFMWbQLXjR9PwLS3DCCcfZH2sMO+08zHryNWRXNZIbsCC3GOfNvxnd9xtKsMQgISER1VVV3idF+j46HS8OEavdXqidgUA+WNlEE5o8MFgo7tHGjRuxePE9OHDoMIQ69MC4GXGYtvheDDh6rFmKiRMmIHdFnnc2yUraUnqz8gMQ/BTIgjVXlxcYqDIqjbtROlv/0UfIzExH184xllYed9RYvPTSS95RR1tlTfS5qM/6APDb7YXaIQjETnNN2ExW4YlalCKjgCAqKM7Dy6++iK93LPbwRL9iYV/YfvTdIrU/EEjRpjep3pVqBQev271FdqLILu+J2ZYJkEUxIAgQO57cvqidWoIo5pvqCM4xeH1StMeuyCefz0bUH9LYeWR9yixJO6Z2Fxh6S9kpMkqZxiTX7QBhPp5b2QmzFgoobc872f+ct9s+Cfhf6ZsDpNzgwQAAAAAASUVORK5CYII=)
Name the shape given below:
![](data:image/png;base64,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)
MathematicsGrade-1
Mathematics
Andy has 50 stickers. Danny has 40 stickers. How many more stickers does Andy have than Danny?
Andy has 50 stickers. Danny has 40 stickers. How many more stickers does Andy have than Danny?
MathematicsGrade-1
Mathematics
Find the missing number in the equation 30 – ___ = 0
Find the missing number in the equation 30 – ___ = 0
MathematicsGrade-1
Mathematics
Find the missing number in the equation 90 – ? = 20
Find the missing number in the equation 90 – ? = 20
MathematicsGrade-1