Question
If a decimal number is 7 ones & 25 hundredths, then the digit in tenths place is
- 7
- 2
- 9
- 5
Hint:
First try to make number from given data and then the number just on the right of decimal will be at your tenths place.
The correct answer is: 2
Solution :
Step 1;
number at ones place = 7 x 1 = number x 1 = 7
Step 2 :
numbers on right of decimal
25 hundredth = ![25 space divided by 100 space equals space 0.25](data:image/png;base64,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)
Step 3 :
sum up all so, number is = 7 + 0.25 = 7.25
if you observe, on just right of decimal we have 2
So, 2 is at Tenths Place.
Related Questions to study
4 ones 7 hundredths in decimal form is written as
4 ones 7 hundredths in decimal form is written as
![](data:image/png;base64,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)
represents
![](data:image/png;base64,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)
represents
The mostly played mobile game Pokémon Go completed it’s five years. In the first year the downloads were 0.7 million, in the second year the downloads were 1.4 million, in the next year the downloads were 2.1 million. The probable downloads by the end of 4th year would be
The mostly played mobile game Pokémon Go completed it’s five years. In the first year the downloads were 0.7 million, in the second year the downloads were 1.4 million, in the next year the downloads were 2.1 million. The probable downloads by the end of 4th year would be
Sarah went for shopping, she observed the dozen apples costs $1.89, dozen bananas costs $0.90, dozen dragon fruits costs $6.00. The fruit that is cheap to purchase is
Sarah went for shopping, she observed the dozen apples costs $1.89, dozen bananas costs $0.90, dozen dragon fruits costs $6.00. The fruit that is cheap to purchase is
The hundredths place in 73.508 is occupied by
First of all try to check if number is bigger than or equal to hundred or not .
The hundredths place in 73.508 is occupied by
First of all try to check if number is bigger than or equal to hundred or not .
![](data:image/png;base64,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)
Represents
If you count carefully there are total of 10 boxes and out of 10, 4 are colored so will be the right answer.
So, we can say that it is 4 out of 10 or colored.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQ8AAAAqCAYAAACtOd4PAAAJvElEQVR4Ae1d3W9UxxXnL0jEA1KCokh5iKpKEBy7leMaBzm2LOFIiVQRVKOs99MbmxLzaScBf2CD5aTCNrDrL4zhpWkeUKNIiBdqhNQ2VKqUNDxEqtomKvkgMQlgvOAFbPhV59ZnNb5ee/de77kb47PScMYzc+bM+c3MuWfmzmVW3bp1CxMTE3NCprRs881yZpzlmWkcZ0plzHiuebg+J3LyzcN4MHXSdq948o0Ry/dKX6/ksF5O+lyaZ5W9MQwGU3s+N8hJ/k+Zh/Vg6kRfr3gYPydtW448jCdTJ/q64VmOGHGb3eibax7LeHCDJicnQSGRSFiU/7anZZtvljPjXK+ZxnGmdpm55uH6nMjJNw9jw9RJ273iyTdGLN8rfb2Sw3o56XMJHrYVROcZj6lkEp6EqSncuXMnFaZm/2ZKeWacy5ppHGeajifpkT6WHEMns03p2p4uLRseKmOWM+OL1WmWM+PpeCiNyniFnTXeZsdCprZlyk+nD/MQNeP2spzH+nM+03T5C6VxOlOzznRpLMMsZ49zmTn8Ho1v6iPTcKSMB7kzNFBOjY7CV1uLWp8Pgdpa+GeDGU+XlinfzhPw+1FXV4dAICAe6sJhBP3+lC7UFrO9HGdqz7e33cxP8fh8iIRCCIdC4vqEQiFEIhF5OcGgpVNKxwVwY3xMXBZKM+viMpRGuJFekuMhGAwiHA57g91sH5FMSZ0Cs31kH9/2vmDcmdrzzb6wx4mH7IHf78eZM2cs48vLn1UUoTA9MwOf349fPvYYjlRVobO8fE44ZPxtxrmcmcZxplSG490VFfjthg0oLS7G6KlTGBgYEAnDw8M40teH555+Gm8WFKC7stLSh9vB7TbbtlDaYjyU11Vejl898QSC4TBOCeo0OjqK+vp6VFdXi8oZGRlBS3s71q1Zg3eKi9FVUZHqPzcYLcTT9dJLOPjiiyhauxZ733oLJ0+eFBkLNMZOnz6NLVu2oKamBoTj4OCgiCyqe/v27SgtLUU8HsfQ0JCIHGt89/bi+Wefxe7CQtC8YpwXG69chqhZzoxzGU77XWUlnn/8cexvbcX09HTKA0ltmN6fnoY/FEJjSQnujYxg/PhxkXBzYAB/3bcPb9bXQ/p3O5nEb6qq8Jc9ezA5NCSizw+xGH6MxdBYWYkzH34orRLOnz+Pjo4OcTn/+vJLvFZSgn92dODGwIAIdj/G4/i2pwfB8nL8/dNPxXU6ceIEaNJJ/8bGxtDQ0CAtBhOJBHyvvIJP9u8HzSuJOXstFkOivx+BwkLsb2/H/fv30xuPQCiEhuJi3Ozvx3+PHBEJV48exdiuXWiIRCxw7927h7t37+Y8zMzM4Nr163itogJ/amzE98ePi+jzVU8Pvu7pwfbycvz+gw8snST0oTrpd/bsWbS0tIhiR5Vf/vxz/Lq4GP9oacG3R4+KYPd1by/+8+678G3ahD9fumTpJIkdeQKxWEwcu3PnzlnLctqjoCe1hE4PHz7E1fFx1Lz8Mj5uagLNK4k5e6WnB+N9fXi9oAAH1Hjk1iiq8XCPpxoP9w9NNR4A1PPIfgDRI1M9j+zxMp/4hJ16Hs4N/aKeB2+Y0p5HUJctjl0/9TycD0h2r9XzcGcIySjmw/Ow9jwW2jDVPQ/nE0GNh3PM1Hi4NxrsTeXDeOieR443gtV4qPHgCU2Ufityw1SXLc4nghoP55ip57E8PQ99VaueR8ZXh/T01Fe17ib4ivU8dM/D+VNUPQ/nmKnn4c4wmcujfOx5qOehnod6HoJHBFaC55H6toW+jqM/6FWteh7On6LqeTjHTD2P5el5zHvbouc83A9+mgRqPNzjp+c83BuRvC1b9JyH+wHPT02majzcY6nGY3kZj3mehy5b3A9+9TyWhp0aDzUejo5061e17gcMbcbpty3u8CPs9NsW58Z+0W9b1PNwDigvWdTzWBp26nm4M4T0yjYfex7zli26Ybq0CaB7Hu7xU+OxvIyHfhin5zz0nIee88h6q0GXLfo/iWU0GObpRdof0OPp7rwCPSSm/w1h1pZZly26bLEb3kf1q1o9nq7LloxeiHoe7rwOMiIrwfOglywU5vzv6fpJvvOnqHoezjHjt1W6YereSOXjbYt6Hup5qOehG6ZZL8t1w1Q3TDMaDPu6XTdM3XkFK2rZouc83LvdekhsadjpssWdgSJDn7dli34Yt7RBz2t2NR5Lw1GNx/IyHvNOmKY7nj4xMABa60iE744dw9ju3akb4+j6Orq7JdfhwYMH+OHGjdSNceOxmIg+NAG+6e2dc2NcrnXh+sglNr9tkcKO5PCy5bPWVlw9dkwEu2/6+vDFe+/NuTGOdc01JZ3Mb1skseNXtXSbPd1cmGtdqD76fXftmnVj3KXmZtC8kpivX/X2ZndjnD8YxM6SEjwYHcX1WEwkJAYH8bemJjR6cJfn3elp1FRV4eO9e3FneFhEn5vxOCbiceysqMAfP/rI6lTJfy5cuIDOzk5JEVbdX1y5gq0lJfh3ZycmBwdFsJvo78f3fX3WXbWfXL4srhNdpE2XeEv/Ll68aF12LS0nMTUF36uv4rMDB0DzSmLO3ojHkRwcRKioCO+0tS18V20wGETB6tVo3rQJO0tLRcKejRvx+vr1KCwoQOehQ2hraxMJBw8eRPPbb+PnTz0F37p12FtWJqLPrtJSUPjFk09iy9at6OrqEtGHcKK6t23bhrKyMhw+fFhMDvVLw44d+NmaNYgWFYH6TGI87N64ETteeAHPrV2LcDSKQ4I6dXd3Y/PmzaiurhbFjvuoqKgIra2taG9vF+knGt/7mpux/plnENqwQayPqN+bysqwfvVqtNrvqqUNU1q6kIt1cmQEkWgUwUgE4bo6kRCqq7NkRCIRkLEKhUKiIRwOI0T6RKMi+hBOpFMoHEZdJCKqC2FFuJFO0tiFSRZhR+NACrto1Oob0omC9FhgGeLYhcNWH0nrEwgEEKF+IhyF5qs1viMRRN94A394/33LTrDNsA6J8Ymx27dvW6/0krO31hO1x9Ol0e4vpzPNKi2ZRFI6ZGgbt5OpE31NHktvaV3yUb+Bn6mvGc+2zxfkyYdej5DMBXG1zV+znBlP13+cz5TKJBIJy9FgezHHePBr20eJTk5OgoK0Tl7JIT280MdLOdJ9o/Xfytn4Z8NBdI7xMDM0/v/z+4qD4qBjIP0YSH3bwgCRlaY4U3vcXi6b/J8yD+vJNBt9uCxTaR7Gz4mc5cjDeDJ1oq8bnuWIEbfZjb655lllVpiuYenSMvFwPlOqw4wvVqdZzoznmofrc9K2fPMwHkydtN0rnnxjxPK90tcrOayXkz6X5vkfMPEsqO1xhtkAAAAASUVORK5CYII=)
Represents
If you count carefully there are total of 10 boxes and out of 10, 4 are colored so will be the right answer.
So, we can say that it is 4 out of 10 or colored.
The play station 1 was released in 1994, play station 2 was released in 2000, play station 3 was released in 2006. Fans observed some pattern and expected the release year long time before company announces. For the shock to the fans play station 4 was released in 2013. The year fans were expecting the play station 4 is
Solution :
Play station 1 in 1994
Play station 2 in 2000
Play station 3 in 2006
If you carefully observe there is a difference of 6 years between every release so, as per prediction 4th station will release after 6 years from 3rd production that is 2012 .
The play station 1 was released in 1994, play station 2 was released in 2000, play station 3 was released in 2006. Fans observed some pattern and expected the release year long time before company announces. For the shock to the fans play station 4 was released in 2013. The year fans were expecting the play station 4 is
Solution :
Play station 1 in 1994
Play station 2 in 2000
Play station 3 in 2006
If you carefully observe there is a difference of 6 years between every release so, as per prediction 4th station will release after 6 years from 3rd production that is 2012 .
The world record for long jump is 8.95 mts by Mike Powell, record for long jump in Europeans is 8.86 mts by Robert Emmiyan, and the record in Olympic is 8.90 mts by Bob Beamon. Among all the one who holds the longest jump is
Step 1 : Compare first two
8.95 by Mike Powell and 8.86 by Robert
8 and 8 first digits of both the numbers are same.
9 and 8, so Mike Powell.
Step 2 : compare result of previous with current left,
8.95 by Mike Powell and 8.90 by Bob
8 and 8 first digits are same.
9 and 9, second digits are same.
5 and 0, so Mike Powell.
So, Mike Powell holds the record with a jump of 8.95 mts.
The world record for long jump is 8.95 mts by Mike Powell, record for long jump in Europeans is 8.86 mts by Robert Emmiyan, and the record in Olympic is 8.90 mts by Bob Beamon. Among all the one who holds the longest jump is
Step 1 : Compare first two
8.95 by Mike Powell and 8.86 by Robert
8 and 8 first digits of both the numbers are same.
9 and 8, so Mike Powell.
Step 2 : compare result of previous with current left,
8.95 by Mike Powell and 8.90 by Bob
8 and 8 first digits are same.
9 and 9, second digits are same.
5 and 0, so Mike Powell.
So, Mike Powell holds the record with a jump of 8.95 mts.
The Tenths digit in 157.842 is
The digit multiplied by their place values and added together gives the number.
The Tenths digit in 157.842 is
The digit multiplied by their place values and added together gives the number.
7 Tens 3 Ones 52 Hundredths in decimal form is written as
The digit multiplied by their place values and add together gives the number.
7 Tens 3 Ones 52 Hundredths in decimal form is written as
The digit multiplied by their place values and add together gives the number.
![](data:image/png;base64,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)
Write it in fraction form
The digits multiplied by their place values and all the results added gives the number.
![](data:image/png;base64,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)
Write it in fraction form
The digits multiplied by their place values and all the results added gives the number.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMoAAADvCAYAAACzBEstAAAgAElEQVR4Ae1dB3dV15X2H5iVWZlxxjNJIDaxEUUgMMahV0lPDZD01Lv01BsSiC56R8XS03vqAhtsjG1abAPGtGASx1lJHBvbJC5UG1MEEqCCAPPN2md0GdlDu/vceDmZfdc6elfYd2ufffd3zvlO+d4jra2tkCIxkBy4fw488t0AXblyBVIkBpIDV77VgXwLKC0tLbje1YUb33yjXbq++QY3qdy+Dbq3wuat27ctsaN8u31b+afrm/H8D903w0+d90A2qJ70XnXtGc+TPePeCt/Ihq49ep7ylrBAmKDO5A5QqAVp7+hAyerVcERHIyMmRrukxsSASkZsrLYtspESHY10C/wiW+SXJba67Tis8Ks7VmQrNToamRbELa37HVhhi3KCfCObVuQHxZ/eqWW+Ud5aEDOqW1JkJBpra3Hjxo27AKWrC1F+figZPx47k5PxWnw8u7yZkoLZY8YgydMTbzocbDvkw9aEBLwaHw+7hweej4jA9sRELXu7HQ4UjhqF/OHDQX7q1HNHYiKawsIQ9Pjj2BwdjW2avu1yOJA1fDgWTJigHbediYmoDglB6JNPYlt3HHXq+npKCqL698fyyZNB9zq2KG4VU6YgftAg7XqSH79OTkaYhwcqAgK0c/cNhwNFXl5IjY0FXf+nR2m7fh0poaE4kJ2N1tpanHc62aWtrg6b0tOxcto00L2OrYtVVfi6shJz/f3x2dq1aHa5tOx11NdjfUoKqmNitH275Hbjk1WrkDN+PE6VluKipm/tdXVwxcXhtZwcbd8uu914f9kyzPT2xgWnExRHnfdwpbYWCwIC8EZ+Pq5q5gf59rviYqyy27XrSXVqranBHD8/vDN7NlpqarTq2VZfjxciIpDtcNwfKLvT0lRiniwpAbdcdDrRlJyMpUFBoHuuHXrudGkpjq9bhyJfXxxdvhxnysq07F2qqkJtQgIqIyK0ffuyvBx/XrIEmWPG4G+rVuG0pm/NTieei4rCS+np2r59VV6Od4uLUTBxIk51x1HnPZyrrMQcmw3bsrJwvrJS6x2Qbwdnz8bSadO060l1+rqiAjN9fLCvsBBnKyq0fKMGpSE0FDkCFAEKBzAClNZWNSVsDL2kR3n4nlR6lIePVU9wSo/SPVyToRcvgWToxYubDL2Eo7DH28JReKATjtLd2wmZ5yWQcBThKOxWWzgKD3TCUYSjsEFHZFc4Cg94wlGEo7CBJxyFBzrhKMJR2KCj3k44inAUdgIJR+G12sJRhKOwQScchQc6iptwFOEobOAJR+EBTziKcBQ26ISjdJ+Zp4NbstfLfAskHMV8zAh0wlGEo2i12rKOwgOecBThKGzgCUfhgU44inAUNuiEowhH0Uoe4Si8VvsfnqOk2u04kpeH642NaK2uZpdbTU3YkpWFdSEhuNnQgFaXi12uut2gHb/FAQE4XVKCa+SXhr3bjY3YlJqKhthYbd/aamrw+Zo1mD5hAs6Vl+Oqpm+3GhpQR2IJubnavrXX1ODjFSsw18cHV1wuUBx14na9vh6LAwOxt6AAXfX1WrbItz8uXIh1YWHa9aQ6ddbVYYG/P96bPx+dlG86ubthgxIKuetR4KtXr6K9sxMRgYFIHDoU8/38MMfHh12K/fwQPmQIbP37Y9GUKUoYgsQhOGWev78SDpjQty8KfXwwLyCAZcf424unTEHo008j2MtL27f5AQGY7u2NUU88oc706/pGsZrq5YXoZ5+1xLeciRMx7sknQTGkYsSA81kcFIRJHh5IGDECC4OCtGxR3DLGj4fvgAHa9aS6LAgKwvgnn0TqiBGYb7Ox85ZyvtjfHyEeHsi625l5AkpbRweiAgORNnAgFk+ejOIJE9hlmbc3Ivv1w5SQELgaG/FcdTW7VNTUoKK6Gv5BQVhdVobK2lq2LfLD1dCApLQ0xCQmqnsd35x1dVhVWooJkydjbUWFJb7FJiYiKz9f27eq+nosWbUK3n5+oBhaEbeg4GDkFhZa4tv8JUsQEh6ubUu908ZG+EyciFQvLyzRzN2llLtPPIHc1NR7q7A47Ha8k5eHjsZGkKQMt9xoasLG5GSsW7dO/TErfixbtgydnZ1WmMKOHTuwYcMGS2y1tbUhPz8f33zzjSX2Nm3ahEOHDlli68KFC5g9e7YltsjI8uXLceTIEUvsnThxAlVVVZbYIiPFRUU4UFiohl7cvKXnbqxfj5eio78/FZa6mBhQctN1/fp1diG1PgLIggULcP78edy8eZNti/yg66WXXkJ1dbW2bwSOs2fPIjMzE5cvX7bEt/r6erz55pvavt2+fRtffPEFCgoKVPwojjrvgRwqLi7GW2+9ZYlvH374IUpKSrRtGe90Vl4eXs/Kwrl/NLkiAYr5xoGyRoDCi5sARXoUVk8gPQpv6vp7X3CUHoXXMkqPwoub9CjSo0iP8gCOS0NWAYoARYAiQHlwNyuzXg+O0d1ms4SjCEdhtbBGMlE3LdPD5sFHcZPp4b/DwS0h87xkFDLPi5twFOEorB5Uhl4y9GIljgy9ZGWeztU8qMg6SvfMiXAU80MbY5uIcBThKKxeSvZ68UBHw0LZ61VSor6XT8i8+SSi3k7IPC9uQuaFzLN6OyHzD+Yjd+MrwlGEo7AA13MSRDiKcBRWEglHMT9MIuAJR+khgCccxXwSCUcxHzNjRk44inAUVm8nHOXvyFFIruhwbi7a6+tx2eVil66GBmxMSvp/dWb+1q1b1CFoX1afmZ8zZ462T4aBH/yZ+YICdNTVsfOWcr6rsREvRUbe+8w8yRVFT5mCeZMmoSEpCdVxcezSlJSEjNGjERUVhddeew0vv/wyu2zZsgWbN2+G3W5HE+mFbdnCtkV+kD90jjw9PV3bt1dffVVN59psNjz//POW+Ebn7+fPn2+Jb263G0FBQSp+VsQtLCxMbYzUfacUt7KyMiQkJGjX03inwSTH5OODhsREdt5SzjclJyNj+PD7yxWF+fnB9tOfIs7TEzEDBrBLvKcnJvz0pxg1ciRycnKQkZGhXYYPH47k5GQl5KBjj/zx9fXFpEmTtH3LyspSPg0dOhQOh8MS38ivwMBAS3yLi4vDsGHDtGNP8c7OzsbIkSMxdepUda/zDihu1IiOHj1au57Kt5wcDBs0CP69e4NyTzd3xz36KHLuJ1dEQ6/f5OSgra4OzVVV7EKqgi8kJmLt2rVGr639SYouHR0d2nbIwPbt27F+/XpLbJEmGskVkTqMFdfGjRtx8OBBK0wp1Rqr5YreeecdS3wjhRin02mJLTKyYOZM7J8+He21tey8pZy/3tCAF+839LL6+1Fk1sv8DA69cFmZ58VNZr1k1ktmveQo8INbDzkK/OAYGavnPT9levjvOD2cEhqK3Wlp+Lqy8oH79u+2T8b4t4tOJ2ToZT7BZehlPmay4Njd3UqPwkse6VGkR2GN2Y1hCbXaIi5hHnwUN9kUKZsiWeCTTZHmAUcNlmyKlE2RLMD17O1ketg8+Ki3k+lhmR5mgU84inAUVuL0bLWFo/BabeEowlFY4BOOYh5wwlF6aCbJOgovgWQdhR834SjCUVi9nXAU4SisxBGOIkqRxs6R+32KCouosGg3MELmhcyzkkjIPI9TyIKjLDiyANdzWCgLjubBJwuO169DNkWaTxxjCla+Z948oReOIhxFu7cTjtLNURx2Ow5kZaGluhrnKirYpa2mBhvi47F69WrqFS25Fi9ejCtXrlhii1REGhoaLLF1+fJl5ObmorOz0xJ7pOayb98+S2x99dVXKCoqssQWGVm6dCkOHTpkib1PP/0UFRUVltgiI/MKC7E3Lw+tbjc7bynn22pr8UJ4+H3kiq5fR9y0aXDb7Tg4dy7emjmTXQ7Pm4dFAQFKYePo0aP405/+xC5//vOf8cc//hFpaWnqJb3//vtsW+QH+bNmzRosWLBAffWAjm8ffPABDhw4gPDwcBw5cgS6vtFXIVCD4HK5tH0jW7t27QIpsVD8KI46dSV7JPFUW1triW9bt27FzJkztW1RnT48ehRJMTGoiozEoTlz2HlLOX94/nws9va+v1xRsM2GZ378Y/j84hfw7t2bXWy/+AWG/vu/Y5CnJ0JCQ5XEDcnccMq0adNApV+/fvD391f3HDvGM6GhoSDpI5LxCQkJYflk2AoODlY+9e3bV0kMkZ/Gf+N8kj9PP/20kgWywjeSZSLfjBhyfDKeIX88PT0xZswYS+I2efJkDBo0SNsW+Uc55tGnD0b85Cfw1cxdet7zRz+6O1BoSEMqLI7QUOxJTVVd16l168AtzZWVqI+OBikL0tXV1cUuJANEz9P4+MKFCyBFRh175A8J6tXU1Gj7RtOc586dUzpXLS0tlvhGQ0LqCXTjRs8fP34chYWFKl5GHLmxI3uLFi3C3r17LfGNevbS0lJtW1Qfumbn5+ONzEycf+45dt5Svjc7nWgMCUGuw6Hstra24hH6QcUACp2Zfys9HeerqnC6rIxdLrlcqI+NvQMUmrniFgMYBJSLFy+C1i64tug5unoCRdcWAYUE3SiOVvhGQNm9e7fyU9e3EydO3AEKxVHX3sKFC/H2229b4ttHH310Byg6ftGzdBFQ3szOxgWnk523lPOX3G402u335iii62V+GlYWHM3HzJi6lq+mk6+mY0/DUssoC47mwUdxk93DsnuYBTzZPWx+sZE2S8qCoyw4sgDXc3uNLDjKpkhWEglHMT9MEo4iJxyVor3RAnM+haPwgCccRTZFsno6o9WWTZHmeYpwFOEobNAR8OgSjiIchZVEwlF4QyU5uCUHt1iAM/iMcBQe8ISjCEdhA0/WUczzE1lH6eYnxlhblCLNt9zCUb6zKVK+SOjhk0g4ysPHyhhe0qdwFOEo7KGS0dvJXi/z4BOOIhyFDTzhKMJR2MljtNrCUXittqyjyDoKC3zCUcwDTjiK7PWSvV49ZhcJEPcq/xRkfm9GhtqTf6asDNzS4nKhITYWK1asIJ6lzpLTUVROoaDSeW86hnrp0iVte2Rgy5YtSk1E1zd6ns7xZ2dn4+rVq5b41tjYiD179lhi6+TJk5gxY4aKH8WRE3/jGXKIzswbUkrGv3M+ydbHH3+MsrIy7XrS36drzvTp2JWTo868c/OWnmtxu7H+QUeBk0JCsDU5GZ+XlODjlSvZ5WRpKSojIpQk0LVr19Dc3MwupJtFZ+VnzZqlxBJIxEHHHvnT1NSE8vJy6PpGWgOfffYZUlJScObMGVjhW1VVFUh3TNc3Ai4dtyUQU/wojrpxo3ewY8cOS3z7/e9/rxpS3XpSncjG9MxMvJKWhi/WrWPnLeX8ybIyVE2bhuy7iUtQUNs7OjDVZsOAf/1XjO3VC2N+/nN2Gd+rFzx//GP08/CAn58ffHx82IUkd6g8+eSTmDhxorrXsUf+eHl5KekdXd9sNpvyqU+fPiD5HfJT1zeSBCLJIit8GzduHMg3I4a6vnl4eCipJyt8Gz16NMieri2qE9n4Ze/eGProoxinmbv0/C//5V+QeTegGCosScHB2BQZifcXLcJ78+axy9HFi7Fu6lTMmT0bZ8+eBamBcMupU6fUs9OnT1ct5OnTp9m2yAfyx+12KxE8Xd++/PJLJXqXlJSETz75BFb4VlJSgo0bN2rHjVQi3333XSVaR/U24sh9DxQrkj4iBRvduJFv+/fvV8NpXVvGO81OScHzsbH4y8KF7LylnD+6ZAlKbLb7q7CQrte+zEwl2XL2uefALVeqq9EUH4+VK1eq8SONj7mFDNDsEo2PaWhDF9cWPUfXK6+8okQcrLBFXT8Nb9ra2pRtXd/Wr19/RztL1xYNB0mNkeJnRV1JxZIS3Apbx44dU8NfXVvGO51bUIDdubm47HKx85by/UptLTbcT1JV5IruPUtzr9kbmR42HzOZHpbpYZkevs+UcM/GhnoB0fUSXa97rh/0TJa73dMwRPZ6me+lKG6i6yW6XizgUastZ+bN7/eSM/PdwwJqfWSvF6/Vlr1esteL1WoLmTcPOCHzQuaFzAuZNzfWu+h0oi4mBsuWLaORDqu1NsguyfrT177RN2SdP3/ekmSUoZf5noDeowy9ZOjFArMMvcwDToZeMvSypLeT6WHz4KPeTqaHZejF6u1ketgcXSCpIpEr6kEyqfURjsJrtYWjCEdhtdrCUcwDTjiKcBThKD16bmPW8m6fstfLGOfJ9DCrh6JhoZB5872UkHnR9WIBzhjeyF4v84Re9nrJXi826Ah4dAmZFzLPSiIh8+aHSUZv9w9/HmVPWhrOVVbiVEkJuzR/h6N0dXWBW0iqiIJLW1hIGojkabi26Dm66Nx3dXW1utexRaT066+/RmZmpjqmbIVvxFF27dql7RsZOH78OAoKClT8KI46dSV71KPs3bvXEt+OHj0K0gegS8cv453SguMbWVk4X1HBzlvK+eaqKjSGhj7gzLzdjgPZ2WitqVFgIcBwShudO05IwKrVq1UgrPhB57UN7SxdeyQH1NDQoGtGPU8yQDk5OWo/mhUGn3/++TvaWbr2SMShqKhI18yd55csWYJDhw7d+V3n5tNPP0VFRYWOiW89O6+wEHvz80F6DZycNZ5pq6vDCxERdweKIVcU7OeHZx97DIH9+iHAw4NdpvTvj2H/+Z8YPGgQIiMjERYWplXsdjsGDBiAqVOnatkhP8ifkSNH4plnntH2LSIiQvnUt29fhISEWOLb8OHDMXbsWEt8CwwMRL9+/UDx030HVFeSUho/frwlvpHUE8lGWZEfEZGR6P/UU0peK0gzd4P698fAf/s3ZN1Lrqi9sxNxU6dilc2G1zIzsdnhYJftmZmYOWECUh0O1QK9/fbb4BZSJqTuPj4+Htu3b1cqIFxb9By1iKQ6SQqKdK9j68CBA9i6dasCyeuvv26Jb9QDrF69Wtu3gwcPqh0IlOAUP4qjTl0pVomJiWq4pBs38o1ECLOysrTrabzT6NBQrAwMxNaMDHbeUs5vz8pC4ciRdxfAM3S9HHY7DuXk4GpdnZJVpakyTumor8fziYlKO+tb/aPGL0uXLr0jCaRhRj26bds29aJ07dDzFLu8vDw1zrbC3gsvvAACoBUX8SdSd7TqomMThw8ftsTc559/DqfTaYktMjJ/xgzsmz4d12prWTlr5HlnQ4PStsu5V48ickXmZ3Bk1st8zP5pZr3kq+ke/uULUB4+VgQQo8gWFtnCcicZjKQw80lDCNnC8r+AetjYUdzkPIqcR2GBT86jmN++IudRenT71PrIeRReqy1bWGQLC6vVFo5iHnA0nBKOIhyFBThjLC4chQc84SiyzZ4NPOEowlHYyUMtt3AUfqstHEU4Cgt8wlF4oBOOIhyFBTjhKDzA9YybrKPIOgoLfMJRhKOwEqdn6yPrKOZbcOJ2wlGEo7DAJxzFPOCowRKOIhyFBbievZ3s9TIPPllHkXUUNvCEowhHYScPtdyyjmK+xTbiJhxFOAoLfMJReKATjiIchQU44Sg8wPWM2/e6jpJqt+NIXh46GxvR4nazy82mJmxKTr6j26TGO5o/li9fbtm59J07d4Jkgay42tvbMX36dDWTY4W9F198Eb/5zW+sMIXm5mbMmTPHEltkZMWKFfjtb39rib2TJ0/C5XJZYouMLCwqwsHCQlxvaGDnLeX8zfXrsTk6+j5yRZ2dCAsIQHDfvsgeOxYZo0ezS+64cfDr2xfjxo3D3LlzlbYUqYtwy8yZMzFq1Cgl4kBiCVw79BwlDskekVwO3evYmj17ttL0evrppxVYdH2jWPn5+SlpISt8y8jIAMkfUfx06mnEbfTo0UpeyArfUlJSMHHiRO13oHybOxe/GjYMdk9P5FiQuxN79bq7XBHperV1dCAiIADJQ4ZgsZ8fFvj6sssyf39EDBqEwIAAOKuqVM9CqoCcUlpainXr1sHX11d9eSr9zrFjPEPKHwkJCSAZn8rKSi1bZWVlIHUY0uFauXIlrPCNdK7S09O1fSsvL1cLhJSMFD9d30isjkBMqpi6cSPfqJGhBkvXFr3XCqcTk8eNg+OZZ7BEM3eXBgQghDqL1FTV27W2tuIR+kGlp1zRO7m56GhowGWXi11uNDZiU1KSekFW9a009DJmX3Rt7tixAxs2bNA1o56noVd+fj6I2FtxWTn0unjx4g926HXixAlLh17FRUU4UFCAzvp6dt5Szt9oasLmqKi7D70MoKSEhkJUWB6eWMqs18PHyiDe9CmzXjLrJbNePfQJeoKj570ARYAiQBGgPPyWgIvf+dqHnq2J2fsbss2eBT7ZwvLw+Wp8dbbIFfVo5YhwyzZ789yC4iZbWGQLC6vVFjJvHnA0ohCOIhyFBThjOEqttmyzNw8+itv3uoVFpofNvSTpUczFy2gQpEeRHkV6lB580ADGdz8FKAIUAYoA5eGn22R6mDckEY7Cj5twFFlHYfVSso7y8A27rKPcZRhArbaso5hvuSluso4i6yisVltmvcwDjoi9kHkh8yzAGbNCwlF4wKO4CUcRjsICn3AU4SisxOnZagtHMd9yC0fpccJRVubNJZBwFHPxMhor4SjCUbR7O9nrZR583ztHcdjtOJybi/b6elxyudilq6EBGy0+M79s2TJ0dHRQTLQvK8/MX7t2TZ2Zv3XrlrZfZGDTpk04ePCgJbYuXLigRBwsMQaAdAuOHDliibnjx4+jqqrKEltkpHjmTOwvKEBHXR07bynnuxob8dJ9z8x3diJ6yhQUjR2L6thYOCMj2aUuLg6pI0YgIjwcL2/Zgo0bN7ILiS3Q8yEhIaitrYXxO9fmyy+/jNzcXDgcDtA91w49R1ynpqYG3t7eaGxstMS3tLQ0ldy6vm3evFkpnAQEBKg6WhG30NBQzJs3Tztu5NvatWsRGxurbYveA8Vqis2GokmTUBMTw85byvnauDgke3kh2+FQIP6WCgvJFV1ra0OIzYbJvXsjevBgRHp6skvs4MEY+/OfK02prKwslZSUmJySmpqqniPtrPj4eBi/c2zRM+TP5MmTlcQQSe9w7dBz5EtcXBwGDhyIxMRES3wjLTRDFkjHNwJcVFQUBg8erOqoGzfSCBs2bBgIeLpxI9/CwsIwYsQIbVsUo4zMTAwZOBC+jz+OGM3cpeeH/8d/3F3XS6mwdHaCyPyhrCy0ut04/9xz7NJeXY0N8fFYvXq1ZV3rkiVLQMMcK66tW7eqHsAKW9TiUA9FRNWKixQs9+/fb4UpnD17FiTKZ9VFGmZWqVh+9tlnqsezyrf5hYXYm5uLKy4XO28p59tqarAxPPzBckV70tNxzunEqdJSdmmuqkJ9bKwa01Igurq62OXmzZsqCWn7BI25iQvo2CN/qOunIZOubzR78/XXX6tWsaWlxRLfGhoasGvXLm3fyADxgIKCAhU/iqNu3BYuXIi9e/da4tvRo0eVKJ/uO6A60TU7Px9vZGfjfGUlO28p55tdLjTa7Q8Giuh6Pfysi0wPP3ysjKlh+pTpYZkelunhu2xE7QkSAUo3SJTki8gVsQBDQwhZRzHfS1HcZK+X7PVigU72esleL1biGN0/tT6y14vXast5FDmPwgKfkHnzgBOOIhwFxlS20XuZ/RSOwgOecBT5+mxWT2e02l988YVaR+ns7ARpOJsFbs//n5JRhl4y9GIlkQy9eD2ArKPIOgoLcEbLLUMvHvBk6CVDLzbwZHpYpofZyUMtN10yPWy+5aa4CUcRjsICn3AU84Cjxko4inAUFuCEo/AA1zNusoVFtrCwwCccRTgKK3F6tj7CUcy34MJRRK6IDTzhKOYBJxxFtrDIFpaHOIvyTwEUkivan5WFlupqnKuoYJdrtbVYHx+PVatWqelYK34sXrwYdLbfiuu1114DHbm14rp8+TJycnIsk1LasGED3n77bStcw5dffomioiJLbJER0i2wSkrpb3/7GyoqKizzbV5hId7Ky1N6D1q5W1eHFyIi7nMUuLMTCcHBqA0NxeG5c7GfdJKY5Xfz5mFpQADy8/Jw7K9/xQcffMAudLb6L3/5izqXTppSH330EdsW+XHs2DGUlJRg0aJF6l7Ht48//hiHDx9GZGQk3nvvPZCvOvbIN9IvI1kmutex9cknn6jz7QkJCSp+VvhG6ivUwFjh286dO5Xwha4t452mxMaiOjIS78yZw85byvffzZ+PpRMn3keuqL0dwTYbhv/kJ7A98QR8Hn+cXfz69MGQRx/FwAEDEB4ejmnTprFLcHCwerZfv35KKsf4nWuT/Hn22WcxdOhQ2O12tl/090lrzN/fH3369MGUKVNghW8kyzRq1Cgl58Oto+GbzWbDU089peqo6xvFqn///hgzZowlcSPJqEGDBmnXk+pqDw9H3z598KvHHrMkdwf+6EfITE1Vvd23dL1oSHOtsxNJISHYER+PL1atwidLlrDLqdWr4bTbQaodtHOVhifcQo5eunRJicKdPHlSDb+4tug58oeGN9Ttk/Kkji2ST6IduqSZ9dVXX4H00XTskW8ulwvbtm3T9q2trQ3U45GUEsWP3rGObxSrOXPm4Ne//rUlvv3hD39QQ3Pdd0B16ujsREFmJl5NSsLxlSvZeUs5f3LNGrgDA+8z9Lp+Xel67c3IwEWXC2fKy9mlxe1GQ1wcVqxYoVBJEkPcQusBdM6DQNfc3KxtjwyQsiANb+ji+kXP0XX+/HklqmfwJ117pDi5Z88eS3yjhmXGjBkqfhRHXd9ouLpv3z5LfCMQl5WVadsy3sOc6dOxKzcXJJWllbvV1WgKC3swUESu6OGnPGV6+OFjZaxj/VPMesnXPph78QIUc/EywCJ7vWSvF3vxkpKILpErMg8+ipvs9ZK9XizwyV4v2evFShyj26fWR/Z68VptOY8i51FY4BOOYh5wQuZlr5fs9fr/stdLZr3MtZDSo5iLlzH8lVkvmfViDeGMBJJZLx7wZNZLVFjYwJNZL5n1YicPtdwy68VvtWXWS+A3c/IAAAauSURBVGa9WOATjsIDnXAU4SgswAlH4QGuZ9xkZV5W5lngE44iHIWVOD1bH1mZN9+CE7cTjiIchQU+4SjmAUcNlnAU4SgswPXs7WT3sHnwyTqKrKOwgScc5e/MUfakp+N8VRVOl5WxyyWXC/WxsVi+fLlat6Bve+IWOurZ1dWlxscXL14EDXe4tug5ujZv3oyamhpt38jAuXPn1FFgOttvhW+kcrJr1y5LfDtx4gQKCwtV/CiOunGj49h79+61xDdS0yktLdW2ZbzT2fn5eDMnBxecTnbeUs5fcrvRaLff5yhwZ+f/nJl3OHC+vByn165ll0sVFaiPisKKlStVIG7ReW1muQ3g5jffYOGiRbjU0qJtjwxseeUV1NbXW2LrQnMzsrOzcbWtzRJ7TevXY093MnJjRs/RderMGcyYOVPFj/5F196ixYuxb/9+S+r5ybFjKCsv17Zl1JXOzL+Zno4LurlbWYmm4GDkOhzKt2+psJB6yLX2doTYbPD+2c8Q0b8/wvr1Y5eoAQMw6r/+C08PGYLUxEQkxsTwS2wsEmJi4OXpiejwcCTFxvJtxcQofyaMGYNRv/oVHAkJWraS4+IQFRaGfn37IjYiwhLfRo8YAZ9JkyzxLTwkBAP791fx040bxWrIoEGwTZ5siW/BQUF4dtgwbVuUW47ERHh6eGByr16I1MzdyAEDMOLRR5F1L7mits5OxE6dijX+/tianY0t6enssjMnB7NsNkQOHYodDgc2JySwy8uJiXgpPh72wYPREBWFLYmJbFvkx06HA9PHj0fayJHYrunbK0lJqIuMhK+HBzbExGj7RrHKHD0a87y9LfGtKiwMgQMGqPhRHHXew7aUFNi9vFDs64vtKSlatkhWqDQ4GPHDh2vXk+q0NTkZwV5eWG23Y3tWFjtvKed35uZixqhRyL4nUK5fB0mqHszOxpXaWjXWo/Eep7TX1WFjWhrmBwWho74eFyor2aXZ6cT5igoU+fnhszVrQPxHx15nfT0akpNRHh0N8lPH1mW3G39dvRopY8fiZEmJtm8UK2dsLF7Nztb2jSSj3l+2DFmTJqn4URx16tpWW4tZ/v7Ylpen7Vur243fFRdjWWioti2q09WaGhTabNg/a5a65+Ss8Ux7fT023ldStVvXyyq5ooakJBVY0lmiJOKW06WlOLFuHab7+ODDZctwpqyMbUslc1UV3PHxWBMejotOp5atL8vL8f7SpUgYNQrHVq7U9o1iVRoZiU1padq+fVVejneLi5E2fryKH8WR+w7oOUrIAl9fbM7M1PbtbHk5DsyejYVTp2rbIt9IazjX2xtvFhSoe516XqyqQkNo6H3IvADFdCIJUHgNoAClx4Kj9Cjmk0h6FPMxkx6lG3Qy9OIljwy9eHGToVc38C4JRzE9xBSO0toKWlAhgek24SimE0g4Cq/VFo4iHMU02HrO0AhH4QFPZr1KSiAchZc8wlF4cROOIhxFq7eTdRThKOwEEo7Ca7WFowhHYYOOuIpwFB7whKMIR2EDTzgKD3TCUYSjsEEn6yiyjqKVPMJReK22cBThKFrAE47CA55wFOEobOAJR+GBTjiKcBQ26ISjCEfRSh7hKLxWWziKcBQt4AlH4QHv++coISE4nJ0NOh99yelkl+t1ddiUmooFQUG4UV/PtkM+tFRVobmyEkU2G46vWYNWl0vL3s36ejQlJ+O5qCiQnzr1vOJ24zM6Mz9mDM6UlGj7RrGqio3F1qwsbd+uut3q6HT2xIkqfhRHnbp2dp+Z35GXp+3bNbcb7y1YgOUhIdq2qE7tdGbe1xcHZ81S9zr1vF5fjxfDw5GdkvJ/5Ypom31nVxciAgORPHgwFvv6YoG3N7ss9fOD3dMTYx9/HMv8/Nh2yIdib2/MnzwZI3v1wszx49XvOr4t9/ND8MCB8OvbF+Snjq2FPj4oHDcOQx57DLMnTMBCjZiRHxSrAA8PRHl5afu2yMcHuWPG4Jmf/UzFj+KoU9elNhtG9e6NmCFDQPc6thb5+iJjxAhM6tNHu57kxxJfX4zo1Qspw4erex3fKCdCfvlLZCQl3R0o165dw+7du1FRXQ2nBcVVU4Pq2lpLbFVWVytbVTU1lthz19bCbZEt8qmmthZW+Eb1pLiRf1a8A8M3K2w5u9+nywrfampQ1f1OrfRNvQPN90rvoLKmBocPH0ZHR4c6r/UIHdoySktLC7pu3FBK49/cvg0rCunfWmGHbFhpy2p7Vvpmpa0fcj1/yL7ROyDhdMLEt5QiDbDI5/82HBILiYWRA/8NP6Q0SLp/nK0AAAAASUVORK5CYII=)
represents
A fraction has two parts : numerator and denominator.
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49ZhcJEPcq/xRkfm9GhtqTf6asDNzS4nKhITYWK1asIJ6lzpLTUVROoaDSeW86hnrp0iVte2Rgy5YtSk1E1zd6ns7xZ2dn4+rVq5b41tjYiD179lhi6+TJk5gxY4aKH8WRE3/jGXKIzswbUkrGv3M+ydbHH3+MsrIy7XrS36drzvTp2JWTo868c/OWnmtxu7H+QUeBk0JCsDU5GZ+XlODjlSvZ5WRpKSojIpQk0LVr19Dc3MwupJtFZ+VnzZqlxBJIxEHHHvnT1NSE8vJy6PpGWgOfffYZUlJScObMGVjhW1VVFUh3TNc3Ai4dtyUQU/wojrpxo3ewY8cOS3z7/e9/rxpS3XpSncjG9MxMvJKWhi/WrWPnLeX8ybIyVE2bhuy7iUtQUNs7OjDVZsOAf/1XjO3VC2N+/nN2Gd+rFzx//GP08/CAn58ffHx82IUkd6g8+eSTmDhxorrXsUf+eHl5KekdXd9sNpvyqU+fPiD5HfJT1zeSBCLJIit8GzduHMg3I4a6vnl4eCipJyt8Gz16NMieri2qE9n4Ze/eGProoxinmbv0/C//5V+QeTegGCosScHB2BQZifcXLcJ78+axy9HFi7Fu6lTMmT0bZ8+eBamBcMupU6fUs9OnT1ct5OnTp9m2yAfyx+12KxE8Xd++/PJLJXqXlJSETz75BFb4VlJSgo0bN2rHjVQi3333XSVaR/U24sh9DxQrkj4iBRvduJFv+/fvV8NpXVvGO81OScHzsbH4y8KF7LylnD+6ZAlKbLb7q7CQrte+zEwl2XL2uefALVeqq9EUH4+VK1eq8SONj7mFDNDsEo2PaWhDF9cWPUfXK6+8okQcrLBFXT8Nb9ra2pRtXd/Wr19/RztL1xYNB0mNkeJnRV1JxZIS3Apbx44dU8NfXVvGO51bUIDdubm47HKx85by/UptLTbcT1JV5IruPUtzr9kbmR42HzOZHpbpYZkevs+UcM/GhnoB0fUSXa97rh/0TJa73dMwRPZ6me+lKG6i6yW6XizgUastZ+bN7/eSM/PdwwJqfWSvF6/Vlr1esteL1WoLmTcPOCHzQuaFzAuZNzfWu+h0oi4mBsuWLaORDqu1NsguyfrT177RN2SdP3/ekmSUoZf5noDeowy9ZOjFArMMvcwDToZeMvSypLeT6WHz4KPeTqaHZejF6u1ketgcXSCpIpEr6kEyqfURjsJrtYWjCEdhtdrCUcwDTjiKcBThKD16bmPW8m6fstfLGOfJ9DCrh6JhoZB5872UkHnR9WIBzhjeyF4v84Re9nrJXi826Ah4dAmZFzLPSiIh8+aHSUZv9w9/HmVPWhrOVVbiVEkJuzR/h6N0dXWBW0iqiIJLW1hIGojkabi26Dm66Nx3dXW1utexRaT066+/RmZmpjqmbIVvxFF27dql7RsZOH78OAoKClT8KI46dSV71KPs3bvXEt+OHj0K0gegS8cv453SguMbWVk4X1HBzlvK+eaqKjSGhj7gzLzdjgPZ2WitqVFgIcBwShudO05IwKrVq1UgrPhB57UN7SxdeyQH1NDQoGtGPU8yQDk5OWo/mhUGn3/++TvaWbr2SMShqKhI18yd55csWYJDhw7d+V3n5tNPP0VFRYWOiW89O6+wEHvz80F6DZycNZ5pq6vDCxERdweKIVcU7OeHZx97DIH9+iHAw4NdpvTvj2H/+Z8YPGgQIiMjERYWplXsdjsGDBiAqVOnatkhP8ifkSNH4plnntH2LSIiQvnUt29fhISEWOLb8OHDMXbsWEt8CwwMRL9+/UDx030HVFeSUho/frwlvpHUE8lGWZEfEZGR6P/UU0peK0gzd4P698fAf/s3ZN1Lrqi9sxNxU6dilc2G1zIzsdnhYJftmZmYOWECUh0O1QK9/fbb4BZSJqTuPj4+Htu3b1cqIFxb9By1iKQ6SQqKdK9j68CBA9i6dasCyeuvv26Jb9QDrF69Wtu3gwcPqh0IlOAUP4qjTl0pVomJiWq4pBs38o1ECLOysrTrabzT6NBQrAwMxNaMDHbeUs5vz8pC4ciRdxfAM3S9HHY7DuXk4GpdnZJVpakyTumor8fziYlKO+tb/aPGL0uXLr0jCaRhRj26bds29aJ07dDzFLu8vDw1zrbC3gsvvAACoBUX8SdSd7TqomMThw8ftsTc559/DqfTaYktMjJ/xgzsmz4d12prWTlr5HlnQ4PStsu5V48ickXmZ3Bk1st8zP5pZr3kq+ke/uULUB4+VgQQo8gWFtnCcicZjKQw80lDCNnC8r+AetjYUdzkPIqcR2GBT86jmN++IudRenT71PrIeRReqy1bWGQLC6vVFo5iHnA0nBKOIhyFBThjLC4chQc84SiyzZ4NPOEowlHYyUMtt3AUfqstHEU4Cgt8wlF4oBOOIhyFBTjhKDzA9YybrKPIOgoLfMJRhKOwEqdn6yPrKOZbcOJ2wlGEo7DAJxzFPOCowRKOIhyFBbievZ3s9TIPPllHkXUUNvCEowhHYScPtdyyjmK+xTbiJhxFOAoLfMJReKATjiIchQU44Sg8wPWM2/e6jpJqt+NIXh46GxvR4nazy82mJmxKTr6j26TGO5o/li9fbtm59J07d4Jkgay42tvbMX36dDWTY4W9F198Eb/5zW+sMIXm5mbMmTPHEltkZMWKFfjtb39rib2TJ0/C5XJZYouMLCwqwsHCQlxvaGDnLeX8zfXrsTk6+j5yRZ2dCAsIQHDfvsgeOxYZo0ezS+64cfDr2xfjxo3D3LlzlbYUqYtwy8yZMzFq1Cgl4kBiCVw79BwlDskekVwO3evYmj17ttL0evrppxVYdH2jWPn5+SlpISt8y8jIAMkfUfx06mnEbfTo0UpeyArfUlJSMHHiRO13oHybOxe/GjYMdk9P5FiQuxN79bq7XBHperV1dCAiIADJQ4ZgsZ8fFvj6sssyf39EDBqEwIAAOKuqVM9CqoCcUlpainXr1sHX11d9eSr9zrFjPEPKHwkJCSAZn8rKSi1bZWVlIHUY0uFauXIlrPCNdK7S09O1fSsvL1cLhJSMFD9d30isjkBMqpi6cSPfqJGhBkvXFr3XCqcTk8eNg+OZZ7BEM3eXBgQghDqL1FTV27W2tuIR+kGlp1zRO7m56GhowGWXi11uNDZiU1KSekFW9a009DJmX3Rt7tixAxs2bNA1o56noVd+fj6I2FtxWTn0unjx4g926HXixAlLh17FRUU4UFCAzvp6dt5Szt9oasLmqKi7D70MoKSEhkJUWB6eWMqs18PHyiDe9CmzXjLrJbNePfQJeoKj570ARYAiQBGgPPyWgIvf+dqHnq2J2fsbss2eBT7ZwvLw+Wp8dbbIFfVo5YhwyzZ789yC4iZbWGQLC6vVFjJvHnA0ohCOIhyFBThjOEqttmyzNw8+itv3uoVFpofNvSTpUczFy2gQpEeRHkV6lB580ADGdz8FKAIUAYoA5eGn22R6mDckEY7Cj5twFFlHYfVSso7y8A27rKPcZRhArbaso5hvuSluso4i6yisVltmvcwDjoi9kHkh8yzAGbNCwlF4wKO4CUcRjsICn3AU4SisxOnZagtHMd9yC0fpccJRVubNJZBwFHPxMhor4SjCUbR7O9nrZR583ztHcdjtOJybi/b6elxyudilq6EBGy0+M79s2TJ0dHRQTLQvK8/MX7t2TZ2Zv3XrlrZfZGDTpk04ePCgJbYuXLigRBwsMQaAdAuOHDliibnjx4+jqqrKEltkpHjmTOwvKEBHXR07bynnuxob8dJ9z8x3diJ6yhQUjR2L6thYOCMj2aUuLg6pI0YgIjwcL2/Zgo0bN7ILiS3Q8yEhIaitrYXxO9fmyy+/jNzcXDgcDtA91w49R1ynpqYG3t7eaGxstMS3tLQ0ldy6vm3evFkpnAQEBKg6WhG30NBQzJs3Tztu5NvatWsRGxurbYveA8Vqis2GokmTUBMTw85byvnauDgke3kh2+FQIP6WCgvJFV1ra0OIzYbJvXsjevBgRHp6skvs4MEY+/OfK02prKwslZSUmJySmpqqniPtrPj4eBi/c2zRM+TP5MmTlcQQSe9w7dBz5EtcXBwGDhyIxMRES3wjLTRDFkjHNwJcVFQUBg8erOqoGzfSCBs2bBgIeLpxI9/CwsIwYsQIbVsUo4zMTAwZOBC+jz+OGM3cpeeH/8d/3F3XS6mwdHaCyPyhrCy0ut04/9xz7NJeXY0N8fFYvXq1ZV3rkiVLQMMcK66tW7eqHsAKW9TiUA9FRNWKixQs9+/fb4UpnD17FiTKZ9VFGmZWqVh+9tlnqsezyrf5hYXYm5uLKy4XO28p59tqarAxPPzBckV70tNxzunEqdJSdmmuqkJ9bKwa01Igurq62OXmzZsqCWn7BI25iQvo2CN/qOunIZOubzR78/XXX6tWsaWlxRLfGhoasGvXLm3fyADxgIKCAhU/iqNu3BYuXIi9e/da4tvRo0eVKJ/uO6A60TU7Px9vZGfjfGUlO28p55tdLjTa7Q8Giuh6Pfysi0wPP3ysjKlh+pTpYZkelunhu2xE7QkSAUo3SJTki8gVsQBDQwhZRzHfS1HcZK+X7PVigU72esleL1biGN0/tT6y14vXast5FDmPwgKfkHnzgBOOIhwFxlS20XuZ/RSOwgOecBT5+mxWT2e02l988YVaR+ns7ARpOJsFbs//n5JRhl4y9GIlkQy9eD2ArKPIOgoLcEbLLUMvHvBk6CVDLzbwZHpYpofZyUMtN10yPWy+5aa4CUcRjsICn3AU84Cjxko4inAUFuCEo/AA1zNusoVFtrCwwCccRTgKK3F6tj7CUcy34MJRRK6IDTzhKOYBJxxFtrDIFpaHOIvyTwEUkivan5WFlupqnKuoYJdrtbVYHx+PVatWqelYK34sXrwYdLbfiuu1114DHbm14rp8+TJycnIsk1LasGED3n77bStcw5dffomioiJLbJER0i2wSkrpb3/7GyoqKizzbV5hId7Ky1N6D1q5W1eHFyIi7nMUuLMTCcHBqA0NxeG5c7GfdJKY5Xfz5mFpQADy8/Jw7K9/xQcffMAudLb6L3/5izqXTppSH330EdsW+XHs2DGUlJRg0aJF6l7Ht48//hiHDx9GZGQk3nvvPZCvOvbIN9IvI1kmutex9cknn6jz7QkJCSp+VvhG6ivUwFjh286dO5Xwha4t452mxMaiOjIS78yZw85byvffzZ+PpRMn3keuqL0dwTYbhv/kJ7A98QR8Hn+cXfz69MGQRx/FwAEDEB4ejmnTprFLcHCwerZfv35KKsf4nWuT/Hn22WcxdOhQ2O12tl/090lrzN/fH3369MGUKVNghW8kyzRq1Cgl58Oto+GbzWbDU089peqo6xvFqn///hgzZowlcSPJqEGDBmnXk+pqDw9H3z598KvHHrMkdwf+6EfITE1Vvd23dL1oSHOtsxNJISHYER+PL1atwidLlrDLqdWr4bTbQaodtHOVhifcQo5eunRJicKdPHlSDb+4tug58oeGN9Ttk/Kkji2ST6IduqSZ9dVXX4H00XTskW8ulwvbtm3T9q2trQ3U45GUEsWP3rGObxSrOXPm4Ne//rUlvv3hD39QQ3Pdd0B16ujsREFmJl5NSsLxlSvZeUs5f3LNGrgDA+8z9Lp+Xel67c3IwEWXC2fKy9mlxe1GQ1wcVqxYoVBJEkPcQusBdM6DQNfc3KxtjwyQsiANb+ji+kXP0XX+/HklqmfwJ117pDi5Z88eS3yjhmXGjBkqfhRHXd9ouLpv3z5LfCMQl5WVadsy3sOc6dOxKzcXJJWllbvV1WgKC3swUESu6OGnPGV6+OFjZaxj/VPMesnXPph78QIUc/EywCJ7vWSvF3vxkpKILpErMg8+ipvs9ZK9XizwyV4v2evFShyj26fWR/Z68VptOY8i51FY4BOOYh5wQuZlr5fs9fr/stdLZr3MtZDSo5iLlzH8lVkvmfViDeGMBJJZLx7wZNZLVFjYwJNZL5n1YicPtdwy68VvtWXWS+A3c/IAAAauSURBVGa9WOATjsIDnXAU4SgswAlH4QGuZ9xkZV5W5lngE44iHIWVOD1bH1mZN9+CE7cTjiIchQU+4SjmAUcNlnAU4SgswPXs7WT3sHnwyTqKrKOwgScc5e/MUfakp+N8VRVOl5WxyyWXC/WxsVi+fLlat6Bve+IWOurZ1dWlxscXL14EDXe4tug5ujZv3oyamhpt38jAuXPn1FFgOttvhW+kcrJr1y5LfDtx4gQKCwtV/CiOunGj49h79+61xDdS0yktLdW2ZbzT2fn5eDMnBxecTnbeUs5fcrvRaLff5yhwZ+f/nJl3OHC+vByn165ll0sVFaiPisKKlStVIG7ReW1muQ3g5jffYOGiRbjU0qJtjwxseeUV1NbXW2LrQnMzsrOzcbWtzRJ7TevXY093MnJjRs/RderMGcyYOVPFj/5F196ixYuxb/9+S+r5ybFjKCsv17Zl1JXOzL+Zno4LurlbWYmm4GDkOhzKt2+psJB6yLX2doTYbPD+2c8Q0b8/wvr1Y5eoAQMw6r/+C08PGYLUxEQkxsTwS2wsEmJi4OXpiejwcCTFxvJtxcQofyaMGYNRv/oVHAkJWraS4+IQFRaGfn37IjYiwhLfRo8YAZ9JkyzxLTwkBAP791fx040bxWrIoEGwTZ5siW/BQUF4dtgwbVuUW47ERHh6eGByr16I1MzdyAEDMOLRR5F1L7mits5OxE6dijX+/tianY0t6enssjMnB7NsNkQOHYodDgc2JySwy8uJiXgpPh72wYPREBWFLYmJbFvkx06HA9PHj0fayJHYrunbK0lJqIuMhK+HBzbExGj7RrHKHD0a87y9LfGtKiwMgQMGqPhRHHXew7aUFNi9vFDs64vtKSlatkhWqDQ4GPHDh2vXk+q0NTkZwV5eWG23Y3tWFjtvKed35uZixqhRyL4nUK5fB0mqHszOxpXaWjXWo/Eep7TX1WFjWhrmBwWho74eFyor2aXZ6cT5igoU+fnhszVrQPxHx15nfT0akpNRHh0N8lPH1mW3G39dvRopY8fiZEmJtm8UK2dsLF7Nztb2jSSj3l+2DFmTJqn4URx16tpWW4tZ/v7Ylpen7Vur243fFRdjWWioti2q09WaGhTabNg/a5a65+Ss8Ux7fT023ldStVvXyyq5ooakJBVY0lmiJOKW06WlOLFuHab7+ODDZctwpqyMbUslc1UV3PHxWBMejotOp5atL8vL8f7SpUgYNQrHVq7U9o1iVRoZiU1padq+fVVejneLi5E2fryKH8WR+w7oOUrIAl9fbM7M1PbtbHk5DsyejYVTp2rbIt9IazjX2xtvFhSoe516XqyqQkNo6H3IvADFdCIJUHgNoAClx4Kj9Cjmk0h6FPMxkx6lG3Qy9OIljwy9eHGToVc38C4JRzE9xBSO0toKWlAhgek24SimE0g4Cq/VFo4iHMU02HrO0AhH4QFPZr1KSiAchZc8wlF4cROOIhxFq7eTdRThKOwEEo7Ca7WFowhHYYOOuIpwFB7whKMIR2EDTzgKD3TCUYSjsEEn6yiyjqKVPMJReK22cBThKFrAE47CA55wFOEobOAJR+GBTjiKcBQ26ISjCEfRSh7hKLxWWziKcBQt4AlH4QHv++coISE4nJ0NOh99yelkl+t1ddiUmooFQUG4UV/PtkM+tFRVobmyEkU2G46vWYNWl0vL3s36ejQlJ+O5qCiQnzr1vOJ24zM6Mz9mDM6UlGj7RrGqio3F1qwsbd+uut3q6HT2xIkqfhRHnbp2dp+Z35GXp+3bNbcb7y1YgOUhIdq2qE7tdGbe1xcHZ81S9zr1vF5fjxfDw5GdkvJ/5Ypom31nVxciAgORPHgwFvv6YoG3N7ss9fOD3dMTYx9/HMv8/Nh2yIdib2/MnzwZI3v1wszx49XvOr4t9/ND8MCB8OvbF+Snjq2FPj4oHDcOQx57DLMnTMBCjZiRHxSrAA8PRHl5afu2yMcHuWPG4Jmf/UzFj+KoU9elNhtG9e6NmCFDQPc6thb5+iJjxAhM6tNHu57kxxJfX4zo1Qspw4erex3fKCdCfvlLZCQl3R0o165dw+7du1FRXQ2nBcVVU4Pq2lpLbFVWVytbVTU1lthz19bCbZEt8qmmthZW+Eb1pLiRf1a8A8M3K2w5u9+nywrfampQ1f1OrfRNvQPN90rvoLKmBocPH0ZHR4c6r/UIHdoySktLC7pu3FBK49/cvg0rCunfWmGHbFhpy2p7Vvpmpa0fcj1/yL7ROyDhdMLEt5QiDbDI5/82HBILiYWRA/8NP6Q0SLp/nK0AAAAASUVORK5CYII=)
represents
A fraction has two parts : numerator and denominator.
In a marathon, Bucky completed the race in 1 hr 12 min 24 sec, Roger finished the race in 1 hr 10 min 12 sec, Tony finished in 1 hr 12 min 20 sec and Chadwick finished it in 1 hr 10 min 24 sec. If the results were ranked fastest to slowest, then the one who stands medal less is
In descending order, the number with the highest value is written first, the number with value lesser than the highest is written in second place and so on.
In a marathon, Bucky completed the race in 1 hr 12 min 24 sec, Roger finished the race in 1 hr 10 min 12 sec, Tony finished in 1 hr 12 min 20 sec and Chadwick finished it in 1 hr 10 min 24 sec. If the results were ranked fastest to slowest, then the one who stands medal less is
In descending order, the number with the highest value is written first, the number with value lesser than the highest is written in second place and so on.