Question
Write in standard form of 30000 + 9000 + 500 + 70 + 4.
- 39574
- 39504
- 35900
- 39570
Hint:
Use the place value chart to write the standard form of 30000 + 9000 + 500 + 70 + 4.
![](data:image/png;base64,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)
The correct answer is: 39574
Place it in the place value chart.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAikAAAB8CAYAAACsTyBzAAAQ4klEQVR4nO3dPXLiWBfG8UdvzVLAgcsrECswk0zU6WQihKSzDifrRIQm69RRJw0rgBW4HBj2ojdAgqsPhD6QdCX9f1WumnFfgThH4MPV/XCCIAgEAABgmf91fQIAAABZKFIAAICVKFIAAICVKFIAAICVKFIAAICVKFIAAICVKFIAAICVKFIAAICVKFIAAICVKFIAAICVKFIAAICVKFIAAICVKFIAAICV/qpzsOM4jzoPAAAwYEEQlD6mVpFS9UkxPI7jcC30BLmyE3lpD7FuX9VODW73AAAAK1GkAAAAK42+SDmtZ3Icp8DPTOtT12cLAMB4jL5IAQAAdnKCGqOHhjn4aKeFM9fG2yp4e+36ZHpjmNfCMJErO5GX9hDr9lWNOT0pAADAShQple20KDBmZbdw5DgL7VLtF9q1f9IAAPQGRUoVp7Vmzlyb2C8PWk0dLTIrj43mqfYbzWdrMRYXAIBsFCmlnbT+d6WDJG8bKAiin608SZv5rR4ST9tEWx3e9YcqBQCATBQpZZ3+6P0guf5R8XG1r3o7+nK10e9UleLKP77p1Wj73XdbOFkAAPqr9rL4o3P81EGSVlM5qxttvk7S68T4xYueJlkND/o8Ssr8NwAAxo2eFAAAYCV6UsqaPsuVJP+o/ZIuEAAAmkJPSlmTv/XNlQ6raWomz3m68a0ZPuNWZfuB6/RtRPFr89oq8pznNt1uGdF2bLrIxSOwBUhHTmvNUjHmc60oipTSJlr+8CRJm3n8wptvJLm+vrNQLQCM3EnrmSNnep4NGrfR3HHk9K3S7QBFShWvb9dpxAbXPyrYLxkHm2Gy3BvTtY1p2N428fu9uIsGPB7vwXbtFlOtDtJ5dmcQj/E2/OuxmWtGt1UuipSUV70FQYF9e8J2xk/WGJXXt0BBYE4/Pos+MNgeCAAGZre49Kwfs4o+44vuYfWTWz85KFLQC9F4H8dx5NxcqTe59YCT+S3l1liX9FiDsLvWfMys7tkC95xLbY+QeLzsHuGC59aB4vGtsG1EodiEjztb67RbZFwLxba0KPN8Nuejvia2ABlyvKTd740kV/6vvJ71V71tPUkb/WcEtPxWKkWv557GPKih5uEYkPLXwjbwpEDe9nYLT4HkBZ6nQEr8uH5wNBsf/cBNtol+Es8RPW7ymY++G0gKzs2Pge/eeDzzubdedhvFn2Ob9RpKPJ7rVji3G4rmKh6PvDZu4BtPWiy+JeNyblwgNsbjuq5xTYTnmHOdpF5n4eerl49I+5+n99+DZeJVPJePiVcdzcY6fH2FXks6B6XeE4Xz09+Y05MCy2202dzbUuC6VYHrH9P33Dfz8jMxwpWFk/frt5753Cet/9sovuWB0S5z9eG81xI9XnzLhaPv6nAwht4VOrfHSQ4QN3+mq/SQwGoK5LhIbEyHgw6XGO21nJTZ0qLE87Wcj/Y0tAXIYOMVOerzIOnlqcD4xKmeXUkfXxm9w8U/9+7mp8cxp0iB5QpsKWC8AePjgqKtCqRNulooZjOPdYmexxhF95gnWu7jY46i21LzTdaD3XktxuswxypNlnttk6O0755bn5TLcaHYRI9rTrUrs6VFlecbTD5CTW8BMrR4PVTx90Sp/PQw5hQpsNydLQUM7vM03Sxc1yb7m0qOyVI/oj9Gm/nt+72JMQvZxUnkzmsJt1zw/kmPpn79x/jLWPTcHiT+LS3+c3zIHlQFclw0NnmPGz7GYTVN9wqF00Q/vk7ln6/lfLSmTLwuCuRyqPG6yOsdSbrV61L8PVEoPz2OOUUKcMP5W0ZyqvlBq2k0gHKnhbkGgtGV+pg/3nXODW0iH+UMO14TPb2o2G2U3W9tdOML1oP1NeadFymsRPpYfV0N8xEOya4V6dptX+D+8PEza2xDYqp52Ne/+b2TTl/6kDEOxuhzzX6sO8ItF7JuTZ1nC5Q4NwtVikmkdGxuP0Z83NKNZQQqPV+/8nFXmXhVMrB4Gc69bQet/r01E1GSdlqc5ynr298V4lgpP/2LeedFClBbdEsntTDStacj3W0fn/Z3WdfA+P/MKXrR3k2GZHG0W9y77VPyddQ4t+7ciW9ZRWNT4DEKbWlR5vl6kY8KmtoCZKjxMr2+hYNSV5pm3VLZLeQ483Mviv+r2piQMvnpc8wrzQkK1Tz8huJTU3Mmzo1WkWmjTSh/LVTPc+ZrzJuCXGgqqxv4vldsmu9lym1em3C6ajg3t/BryXwdbuB5BacgJ6YDZymaq6pTkIvFN2paN8fJ2OQ/bu6U8ULTO7Oer14+Is18nuYpMAW5RLyK5/Ix8aqjnVjf/3zIin2p90Th/PQ35vSkYBgmS+2LblXw+nZdlvrcSv5xr+VT7AG13AcZMzk8bWOze9LPKW+rIJxVlHkLquTr8LZ7fX8ue24dKhTfCgrFpsC5Fb1OCj+f5fmoo5EtQAYcr5hw9l/4WRAXTi+uu+R44fz0OOZdVEb5yn3Dji18c3NRmvAxM77h3npcU/Y3yozK9NY5Z34jSz/P9fmT53uj1yjxuN72AedaUTPXAppAruxEXtpDrNtXNea97kn5nbz3f1hpmlwy/bTWLLz3p1jTaY0lgU9az6LNowybeXrJ9t0iZxfMrMG/G81T57vRvMDjbuaO/n2vca4AAFikx0VKRyuRSiVW76uyIqkS7WuuvtnjlQYBAOPW4yKl45VIpQKr95VdkbT86xrtapgAgMHrcZHS0UqkUrnV+0qtSCo9fPXNHq80CAAYtx4XKd0qtnpfdyuSlj9XAADsMooipZmVSKW7q/c9ekXSCKthAgBGYNhFShMrkYa/K7N638NWJI2wGiYAYASGXaRoouWvcFGt2E6R4RRf15e5k3s0niPWdv4h30+M83j9Lj8sEtI7TxrbwxvFhHNjXEp6F9Ear2v+Ic9LlB5FzxUAAMsMvEhRAyuRSsVX72tgRdLLQ7MaJgBg2JxwJbhqBzuOahyOAeFa6A9yZSfy0h5i3b6qMR9+TwoAAOglihQAAGAlihQAAGCl2mNSAAAA7qlSbvzVxZNieBiI1h/kyk7kpT3Eun1VOzW43QMAAKxEkQIAAKxEkQIAAKxEkQIAAKw0/CJlt5DjLHR7r9+T1jMntq9Nci++fGWOb6otMj009+SuNZ3lDbka/yzFXXdzMEBBDTUPb97RD1wpkLxgm90g8F0FUvrHyz6gxvFNtbWDddfCQ3M/rNxZlytTZ3nr3njy0j2rY33L3RzYrWrMh1ukbD3jjZKd1KPvnv/d9YNj6rj7F0KZ45tqawurroUH535oubMqV6YO82aDseTFBtbG+pYCObAdRcrFNvCMZHreraRGlX/636I3XP43gDLHN9XWHnZcC03kfni5syNXpq7zZodx5MUO9sX6lqI5sF/VmA92TIq3DRQEb/rnZoujPg+S3GdNE/8yeXqRJH18nXKeoczxTbVFlsfmnty1pbu8IU/zn6W4534Ohqv2irP2edVbkZUET1/6kKSXJ02S/zZ9livp8HmU0v9a/vim2iKhgdyTuxZ0nDfc0NJnKXIUzMGADbYnpSj3OVn7S5o86aWB45tqi2rIXT+RCzsRazRh9EUKAACw0+iLlHM3ZELUffng45tqi2rIXT+RCzsRazRhvEVK1A358aXUkK7jp87jwDK6L6sc31RbVEPu+olc2IlYo0HjLVI01fN5RJeS9f/p61z7vzzlDfQqc3xTbVENuesncmEnYo0GdTHvuU3bnHnlLOb2ODZeC4/K/dByZ2OuTF3kzQZjyYsNbI/1LXk5sF3VmI+6SCm1lHP4hov/frxLqyfZeC08LPcDy52NuTJ1k7fujScv3bM91reMsUgZ8e0eSZpouT/Kd+O/9baB3l4ffXxTbVENuesncmEnYo1mOGGFU+1gx1GNw3vntJ7p59OeN12GsV0LfUau7ERe2kOs21c15iPvSSnjpD/vEoPUAQBoxwCXxW/I6Y/eX35ozyB1AABawe0ePATXQn+QKzuRl/YQ6/ZxuwcAAAxK7Z4UAACAe6qUG7XHpNBlBonu0z4hV3YiL+0h1u2r2qnB7R4AAGAlihQAAGAlihQAAGAlihQAAGClgRYpOy0cR47xs9jdanvSela0bd3jm2qLq2TuZ1qfbrUld7Y4rWexeOXHjlw0bre4mY/LTyqQxLpxp7VmYWxntz/YhqXihoZBOHW5zuHNOPqBm7ETp6TA9Y/JxjV37hzvTrpJVlwLOblvLx/2586KXMXcjlk6bsPKhcmqvIS7vuf+xIJIrJsXj3H675ndqsZ8cEXKeStrBZIbnHNoJja+xfXRd8+/d/3geH2AzLZZyhzfVFtb2HAtXHMfxWgbeKqf+6HlzoZcxV3zdO+Dd2i5MNmXl7T05+sZsW7eJcYUKc0/aXOMP0rGm+WaXPPNEhUv6TdQ1D7/G0CZ45tqa4/ur4XsP3TmG7v5fPQjd93nKsHoAevmPWcH6/KSZPSuxP9AEuvGZfQSj6VIGdiYlFe9nQsvBfulznsB7vRzdTj/s/us6ybGR30ekr87mzy9SJI+vvLu+ZU5vqm2uDh96SP8z5en6y6QUcykNvJB7qo4/XlX+A7VZp435oFcdOek9X+b83+6vn4tzZ1WiXXTdj9XOkhyPU9u1yfTsoEVKXHnwXhzbSTJ9XW8FC66/lF7eVJqY+Pps1xJh89jzoOXOL6ptiil8XyQu0qOn4fsf9jM5czWuvx5Ixfd2f1U9F3P+7GMx5RYN2u30Hyjc3H4/bnrs2ndoIuU2IffYaWfGSPN3edk7S9p8qSX9G8zlTm+qbaIK/qtjdzZ4KSvqAvM9XUMe0KPfvh98bDSv4lZDOSibfFelO+v2a2IdRN2WpwrFPm/lukicAQGXaS8vsU/8DbzvOmo6LXJ3/p2+bv2U+d61PhwhaUmWu6Tt2ilyfKHvPC/+RbesdMfvUd3zL/9Pco/lF3ZLc53Alz/l5YjDfygi5TI9QPvoFWiOyXzA9AY33BPmeObagtJmmj5yw/v1240dxw5zvTSRZ2F3Nlsqufo5vvHl8zvFuSiXdcxQ55+5PylJNYPZt7mGWuFopEUKZmibsjEB6Ak6fh5HqSU1X1Z5fim2iJustT+6McGlnnb7eUbeeP5IHfNIhcdOOnPe9bEAwOxbsTud9gLfFhpGg0mn64ug8wPq+mdxSqHYVhFSoHV+K5vlvCb2uFTyfr/FN4kN2eJpJU5vqm2SJkstY9meAWB3qZZs37InTVuvmfDGSOSMSCTXLSu0K0eYo0GdTHvuTnZi3c1tQDRmBcES+r+WjAW7TPidsm9Gctg3LnrPlem7Pds9vo2w8uFya68hIy1UfLWOiHWLTHWSxnLOikDK1KC3OWcay2LHz5uO0t092uJ6SCw41pIrsh4/YkXp2Hr0ebOhlzFNPWe7UEuTNblJQiM3GS9h0zEuhUUKe08afPMb2f33ijpN1dm28wipcTxjbbtnjXXQuoPXt63uHHmzppcxTTwni3dtls25uVa+N8rUoKAWLdghEWKEx5cieM4qnF475zWM/182uvtxjoBYza2a6HPyJWdyEt7iHX7qsZ8WANnG3XSn3eJQeoAALTjr65PoDdOf/T+8kN7BqkDANAKbvfgIbgW+oNc2Ym8tIdYt4/bPQAAYFBq96QAAADcU6XcqDUmhe4yAADQFG73AAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK1GkAAAAK/0frnY9zIycuv8AAAAASUVORK5CYII=)
Therefore, we get 39574.
the correct option is (a) 39574
Related Questions to study
The word form of 91120 is ________.
The given number 91120.
Step 1: Place it in the place value chart.
The word form of 91120 is ________.
The given number 91120.
Step 1: Place it in the place value chart.
Complete the number pattern of 12500, 22500, 32500, _______, _______
If the difference between two consecutive terms is the same, the sequence is called an arithmetic progression.
Complete the number pattern of 12500, 22500, 32500, _______, _______
If the difference between two consecutive terms is the same, the sequence is called an arithmetic progression.
Arrange the numbers 24565, 12463, 10560, 30000, in increasing order.
Ascending order is another name for increasing order.
Arrange the numbers 24565, 12463, 10560, 30000, in increasing order.
Ascending order is another name for increasing order.
Write the standard form of ninety thousand two hundred and fifty.
Write the standard form of ninety thousand two hundred and fifty.
Compare the numbers 96000 and 64000 using smallest symbol.
Compare the numbers 96000 and 64000 using smallest symbol.
Compare the numbers 20000 and 15000 using greatest symbol.
Compare the numbers 20000 and 15000 using greatest symbol.
The following has 8 in hundreds place is
The following has 8 in hundreds place is
Expanded form of 89,562 is
Expanded form of 89,562 is
The difference of 46210 to 24210
The difference of 46210 to 24210
The number 920 is between the numbers of______.
900<920<1000.
The number 920 is between the numbers of______.
900<920<1000.
The sum of 96,420 and 24,240
Arrange the numbers vertically and add:
Step 1: 0 + 0 = 0
Step 2: 2 + 4 = 6
Step 3: 4 + 2 = 6
Step 4: 6 + 4 = 10 (Take 1 as carry)
Step 5: 9 + 2 + 1 = 12
The desired result is 1,20,660.
The correct option is (c) 1,20,660
The sum of 96,420 and 24,240
Arrange the numbers vertically and add:
Step 1: 0 + 0 = 0
Step 2: 2 + 4 = 6
Step 3: 4 + 2 = 6
Step 4: 6 + 4 = 10 (Take 1 as carry)
Step 5: 9 + 2 + 1 = 12
The desired result is 1,20,660.
The correct option is (c) 1,20,660
The missing number in the pattern of 56,450, 56,500, ____, 56,600, 56,650 is _______
The difference is called the common difference.
The missing number in the pattern of 56,450, 56,500, ____, 56,600, 56,650 is _______
The difference is called the common difference.