Number, NAPX-E4-NC28 SA
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
Variant 0
DifficultyLevel
729
Question
Write the answer to this division in the box.
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.1224.36 |
= 0.12×10024.36×100 |
|
= 122436 |
|
= 203 |
∴ 24.36 ÷ 0.12 = 203
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box. |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{24.36}{0.12}$ | \= $\dfrac{24.36 \times 100}{0.12\times 100}$ |
| | \= $\dfrac{2436}{12}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 24.36 ÷ 0.12 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 203 | |
U2FsdGVkX1+y+352wX8b7pk5PwoU4l5Gm1qfwnnu0sWLkFGBj0fxk1HIh3BRSiNjtUqXVMBf+m5lx2GzrtU6Ws/l6zqvUh3xSiWP+G6d9kRDXbDAvSw/3bG6aP1dHxbfXjQDSVSJxx8N8VM3VdiXJnJIpotSHnBddFFQrc1jmAQ7Fbki7ZeXAR7vL1qnayu5SelrUcHgfRFiU1UUBg8vQmk93fGwgngoaKOPkJL8hfoDTg9g735FduWDuwWQ8NSqkeQEIixLqF5P0oEB0/qFdOpboD1cPEd1zXuz+hnyRn1S7b1wQws2LQHPkCCtD7bDCQz0zBA+Jy/ywmm7z3pG5jYWWFGk68ihyZxxCGcr/3p7ssw9vBincLZv5RruBwaFiDakk8xuYX5BSJEqRCQ7iMqVOdf8L/TOigsUt081HBYwsAw2EZA+VQaLH8R+Gns3lW59tZ4p1Rykkl2k44sPNC3PbyKj4siLWl3FXf9EyPekhAgqbefY4Y9APZScfsNclot2y+NgUKXw3a9Vc9A5envQaT4MdWJYXVEctcbcFwR7M6qAQOiQpc5u2IhhV4KENvrQaA4rY0ocOh417Fq6al7kxud0d0WZd4+Ky1QUdsBxNMbdCmvO7GDMvSTnAEfmv7wWPfz/Q3u+fxTf4TVSpVGM5kGs1oSCnyG8f1Pm3Got9gTbhhZn87zh11wqS7XnN4sAo4Mt3w7AL8kwuSnuCm5JwwX8Q1sP4F8NyRKhHyg8wKd+qcPOz5nmRIlohZNiufR5jQiwA9K6chMN6byNiQM9gCuttguy3BzSxsbaDoYqpzL2dZa8hHXQBaUX1E0LyE5AWp6ZeEPhGcvWjwDB/IY6wSyrHCWDDC/D50QW060JWM+2ntJJPAoKlVARdx9ffqZm3eUC2Kyn/8ZkxPH4i90bD/O6h9eHh/dffmEV6U56N2iyl/HET3JIQXfw15xrewDqzwTO2+q8JLzjOHhyTZp9XDZMXOGRfYgy3Tinl53S4JBzJc/RSAK9+kepejvnQPdMDQZXuq09gnRPBnsEbsmGixwaK0tmYAL3uPl4NAzY4JxX3sYcee7K+1+z+hPpyaar7na5it2qO+ilQskppv4NG49Re+eO8kbaAuuS/icdW1Ut6GGz1Jq0NWCi5B8KTZ0Xd66eNtIBu1e8JURCeu1R/uHGpLS9d+HG1I7lM2YyjMKlYxwSZ9yTYZcd9QURlPZ0t1VieofOkUsFaaG7Q7+iq8Y1d1PXnLoCZWyPC52/xjllw2MKjDzSEHuk07wesbTafdfQpfuOdwehgtBSZeSliCV8Gsr/SYQK97VdZtbQMHU1oOkgxT8FgNtbXR1HGdRzMvYbLTfH3CtWjoCV1d3hDzJuE5YnEyjGHyNT533813ZqYAyJIveZ9oRMSO+kgYzjhZy2Omjdo8FozOHHHLAoKimkXXZJ4zHsnnQefYKyb0E7RrS6h4ihcW10UrlS2OV2miX/ZbVGagyytCM3Ql0mEWIgOeZGE8ogPjF1Fk0TvIg3R5t0RQzvk0ObtzB4G2iT8ikJzvtjbZjJU3eFP0wNjWyu+18sbs/7kW4YXTHPH0GOJH18re52aIURyvejh+rk3h74hq5TunZiyEgMiql3jgkfSeA7PzSJyklhl3uN0njGtP82W7qnYFwNhThf+nY16FD+jDpP+oF6HjuFhvYwuKlYmBIXQsSx4spZKzlMErCLVahTwzasr+0W1jCHzQQU5UmpTsNFgFJ8BEeQeURvh1w6gpfes5EuSM6s767vK0Y/2KDQek05nSXMjnwwHuMW2nBvudC4ByjxJiUc/LaONWfFZ0jZAoZZlkvcK8RE9c8WSZI+JaJCBeolmgJwgT2zvle0TLlAWIdd7uhxcjG1FaBs4bsMLIRgCI7xVq1hox9PwUofcdUbiuC0BTyn+LUG9puxiwwI+XLO7+aQBwrn7+2fPcj3BEUjSCy5mbXvAR0GNpJy+I49KDsS1pble4RvubnJC7xsgLX3U8Y7rBbJ8HUSeEkr4ZtD7yPTEg39McI8pUY1B2HmPn1hY/a1R0yTAnaXAZUQpRRkCTAbOoxAiRX0SAggwVWBSO95c34OoD6vqufbTmn7QSHgjYnHzpguEIVtcBOyAZCIr3peBScHNx6qjj2UHwWGV3mb0YZ/e8BK4us1CrNFvxf5dxkexVALQplOAa5i3DGhBuu7QGo82c67t+DrFrxXCqXbstcXlaAk8GhTy1YuvLoCYLEgN8U4n1M6j7e60dlY9n1pOHi+hq8+jy43pwS1GA7iEX+jARG/ka3kjHkz2ujC/LrJYyOxMBvYwqwWhg+vSENlTJ5xdFghVy2WzDyT5CXQwPbX4VQppP5VOxbKMWx14OhWAvME97mrkOX3vo3ZzqoNiskitIklsb9PKTmeuNLkWPg6OeiEmYNtRXRCRpfGd5uVZJetCIagYN9rBBu7O1MrNJ4RC4jNtyQHw0bMSaWkMyir/cqaWOWYOa4Sk6dC9nPnI8q+HvzOywLQEJij6XXmyho6kmK95Rf714i9zF5U70vkGT9YLVpOCRkIR4MmEO6dg2KvXL0eevYjEWB8Lh76GFUWzP9jJ2FWlq3wlQ2seOZ35P3lVIyARWGTOkhPGco8CZlrwrgtG+VWy8x/0LdqNL+A+Xui3ExGxPgGWM/JYPmX1O0V16bWeQHlr3OZiXwkPgr9ZLhQ4uO5j38/+3aZHwK9VTxvqC8eNmMCf6ryAlOBUN1bdryQhCuP70WBdvfLHzfFZ71IeN9RTgkt7twTS79Z1eN5GNjXE6oZodJoBjM3Jd5iSUj8stlBt2V0mmkxoeVQ3XglaZRVYLFy7VVISUNiqJXZH10dhHun4+x1A1Cvsv8KYV8GYJ5io/YCupeIJtAldmooo645eMK5LbP51pMUpemv7NDvU8MZgUTm3RpKN0fyq+jeivcw7R2bAeNPz7JY36erZiEiYGKg1eZyR6SjEHetPyHc3zcJcOTsVl5qIVyS9z1NHMc+g1bgBAb5zoq0G2NLWiFyOGSr0fiAWvs3yOYSczzkGFas66qFrunjuRZR0lBRDQHwGEyuhq91mxptkF29h22oCaypc1HqTVFOu1zykXaOpYr4113TunDkwfRjPOWBEVSLfX3xa2x39Gbq3BjuD/0jj0chuMlQdsGlhoy3u5G2wGn4OQB8fZSzPBDfFJv94IGgibNsTG0WFEBA4lOxonobCLcJ0e8OTPKe6j+JoOyz9MLm1csOQVJTuz0sKJSLf46+vuWer9CKFOc9a1q/iASX57ECIT5E6/HpR81XFzQXXWDtL8iu0ocwn6C3j+kN1jDNf+Pfhcc+j/kdeILUbs+ltnXyognAvLfjkKIvTqqKq5fCL9yIJ998WOz4jsdrwGeDAm2YiOYoCe0eeL4Ftz0Bqbq43b5GU7G5FAQDn+mFByzD0/c/hEX3MUEwxJYCMaSqu1F9xrJefDminOkOPEhleZAC/On3PL8HdXqhIFCZ2CM7Cu9rGpEVqrKL9lCAYpGR8XDBhcFeOsOveDvvZglvjYa0U4RUakXu3MbhXGSV9Y2I7ejFd1MRsoqvxFjT6OJ7g6BD1snloxvdEcnaTzOP2U5i/YeS8NZfmPLPiL5buqNCAEhwv0eVxUt/gtg8IjhnXH8m9t5seeGFmo4B0xYAe2EdQtGe2v4bdQ5rcNBQy2jamUvkgNFJN4abL1GzeVqdjMFcEvK7IJKo0dyP2hlE44+bcV6lcpxACd5TVseHdArFkp3Dzb4ghSgcJwUVaTe6pdeKy7c692969gxfCIJXP9VkTx0y0psnhkRQgQPnznG6HiaG6R+JvhzOOLgxmzh9SCJECoQD1TdeAdLKcjFw8zv7TWVuImaBZHZaxahlF6RaooKnIWqa9tJdJNpLdCq4gHy0WNSNG8KrmkulIWyNKDDE7elOobbB2kZfh7vLQ2nlTkijzdJiW2sZEGjVWifLMGL1rnWQiZQ6yeXTzYWZNvtB8M3h4rgtyr6xLZsTubFkjopmPnGpWNPPBAdd+txiBLZwuCwrkuC3s/KSgD3IiJ4Y0dPch/2TJRWCbZvX0jCJTafCe9+Vt52mSsBJ+ebLCDaNnKZS1or8Kyc7NouW3f4nwBCmurr0HXcrAN0/56t7/aCVYZL90FRFlBfNZb9tF/0NIU62EaXV6QilsxVwxG6/aNzpXdRAzgbPzNh3+oEaSahT4VZgAasxW5lc9cXbKPZu0QHmvmbdIeOVZDA9qDhRbToMbzWeFu0ufITXpZMsgQanSfJqgcpAFPol3oAJ+ueM6pJqfbseehqsqqYpHoWf0szTVGy81br7wsgOb3senHvP1a/i1i/7f3JIdnHh5Bs+aK8fGEA84Qr4MqqUb+KxmXN0voSCHKH3zk8IrkXP8ck+Sp1KnCljKKInQ/0UoOiTrF2vBcoaMUCQTK7pJ3YRFqMRMcYJrmcdpOy0woB6LiJBVnO46xM4BlRuXrEoKNbpbTOpwGgyZevU5agCJwrx91oQw+M5BTtwcNyu89oitrG2sjTSjspIjSRYuZvDLtTICXAfnm6wEiF7V4esQox13pBM2qCHgra1lMkri2W0fWasIAngcExlaw7IcdwvYsekOk6/RxO00WIwjtUXTyd2WNuhqYHAOBGB1sIq64tBYvf2EbpW6daP9fYJc38ruV4Q4n5R6bImnvCajkxtuhLLT+OjO8Ruk7tdsXGTxsQMNS+uD5KXP0Tqk0pThW/kq+dfSXfkyjeK+bF2jhjpua+dXIeJ/LFFQ+uyam9dDEbp2kKzXhC94YszGt2xXfMTLod1InzGVhfYUbd33wDmQNCm0QvQs6i6IoNgIzCx1Q6b1O3P4IgdzTVsAIZLhpJ3gCJmTpsS/LlulsWISajVim6CrNOUBmzYrOgLEYgQlmSlWNO+dVNybV1Ti+NZwZ9lD2hhmnX9yvVzonBRrOmcUwbWShpc4U1oL/nLFT1m3XdyvtMSU0KNz/nZS2KfEU6Lw0tYdxiqJLl9bJwygw1kP9qSJwZys8rtapcl+3H28pgPR7o+1vjmW+DMYVlp5ZCq6brP8B3qXFedsWTTU4wXKz5oYO1tBnAXAK0M4zqzBfSoej1kaKV059XE8FSo8L0+f7dzRYKZj1NhEHJ7L/Nz37mjFp1xPF2D3e7PovaS/0g84Lq9x3GMPCeT9KQF7BC7Ipx8ns9eYBiR+jk8uh0rzBGEi9BJ3QjV069sZWRegW76Msa9A8M9ofDnl3SQFwsJGFtKP+RDVGYfvYMSxmfqStPANLlEiG/H/3qqhANSZFAwRc7+YfPJEKKwDo9FueUdGKcp0M08jO5CUU3DYh1qye7fBZaS8fKJiiABdalZVxDA19zAebvmUJYCCCA5mREfGgJF9dnPDJDegpqN4qNIDMvLVr37UWD3pfqjOs+kgq+lnRxFKEHUwEpzlSoNHF75wnawQM7/GVVAelpnLdDt9xdKo+3a2TtwpI259J/ir63u2j+kGN5ntxTuCE8V4Tbn7m6c+6qox2yW0/VYGdvxbzKXgrrka/LSw5LN/1I7a121wuCLiBiQM59A4RqtlTUNaJc4SSZsr5ZHdPRlbW5QkcB1Mpuz8rM0OAK7itlDJE1E7x4MncyM4iN1blNlvv6rBaCkmwaPuNlsMEoU7+72k7wDuj7yRLtbnE+NA0mDnjM5TVhHlnC7KKvzCddx6aABoqTZE8eQ3P/V7TWV9uHo0MCiHaa8ATehUCjEjf3zFqOw4hTWOv5pN6waco7KlsBV7v+HRHob0VJQo1c8dOnyvumQZNNpgj8o9Cnu9qNJzjot6Sz+vtmKjdnMTSowZLLQUb5+lUNc02Rdt91eWMS1fLkq6IYouSbDGhTI8bAbCJiG6CGPlf6UEHikEg/TbBGilwOPD/hGvCsIVxAslkdMWiod1O6Lsw9e0k/07CcnyUp3I3e8eGFhu1yRfYn0F+Lv6EeZeCGcd1LUMFzj8G04g4hs5YOJ6LA/dG5ZFz+DzXvCdv2luKqS6OzsocjifOgoZngziVF75O+qpNBsQolyyfKq4EYMdV8pDKVLKO3KsgxKXkKhLszz4s1R1QtIr/AaJfiXt68JBoAvzvducKafTL8kR2eoxrSgwzXzt5mJBVE6dAmISnC3HbzL0qfT7ap+sBifCUsGVdtj0cW8/eM50po4DitLHiNsD6AWblRIhNqxPCoFqENJ7zAFSxf5qgCNjfXTS1XZhh6b096ixpVeyEL8Jp8gHdC4k7gWykSC8+zkuvINWYCCQ2oIcZzU7euGfTkkDXj0hq8144L7r0UErKXI+DqbWXgYOsgUPTqZ7PBPXwRW5/zx214xEy+3FXRS+zyp02qVz/r9EJ0o8IYXUVaCS7Ilm6LMCgMTUetFvmeRc1+5m6fA+lPzhOw5fArNFleIOEPNxm9lWh0Mbg8MgS2zfBgyBiLJb/V0g+hOzg0G/VD9xGcxFyrcKwcN6m20e7pYhA8vXGHlK1iUBen1Ms4GSTsVV90d8qz3iEXx3VmZr/AXoM976dRfDx/vJ9x1f00+DOzimVIh3pkNOOZ/ghrbQ4mGdtOuQhKQOJqcbZCwz9PFkigbDkJX+r7/UFl84fW+8uN69IXREuQYwamK78617TlqJSJiWsCRMTIy5CaPQVtaC8WrCWoq7A2EpURBZRlm6gRNkGqzCjgBJJ6H+6hJSbWUzs0GL+6sHVcfLEPnWhM8pGFDLfzezD4iLMlfo5X2sw/DspemDQxmCHavbtvX0w0YXWAGYt2FiDT50C4piFDugjUAiX31W27HE8CVlZtN+Jii926sBz0GCCszoQNBgeCq5Vo4QIxO/bYmJwqNHuxUnGwgzm0zG0+uFZcR58ypz89eFF7Iri1FalMjxs1L6lOFt2bQ9yK/CtewIdh3ofleTDUr94z/qCLSOL2JVwn0nKDMGyPdQzp0nybUNn08Lffs1eP3Kf158nE59dWCpv70tEMujUHmpbIks0qkv2a0PUxz6wcr7ItW6v/MxguNc/CNrA3jJ+49N3vCLzWMhgfDCtPm3+3IsphvPNWADn4xfrjLDvUTLU5ltisATDv5nKF1sko5SyE792vKAzCtqp+IodT6X9tgrjlrCX2MVQR4D2vMfPyMB4O5jjaSe4xpbHulGo00qh4TxyeOL5gMkM/+0jitQhAxE0fxuHlfc8Mshs/EkOZr9J0omwvjqbzRPmLiY65wlRY0ocAyWfwTesLbQjKYt0gF3VzN5ChYvvvtFBH24FCpKq/2Hpuy1UFBt2025mlw9RUnCA9uDO8wCAVCE6z573EGsk0gwImrOlNoM0NqJn1boOBpNrVUyHOC0bexvBoxKnQ0vrboy7sAb+j4q989dM46AvotpwyUwRjEnk80o1hv5Igrqb2TUVoMkgOAFHqBRtvgaGrXbz+bMAxTjO+Cm4U/X43pXnp+9vxcEJIms5l8AFI7xrV9QxEba4ox+IYASAnCrSazCIRGRMooirjQVOqfh6+4NED9x42GEIOaq6EfQC+7N7DvCL8o+fmgDK2QLlWDxNDxtvNTDREfKN/6PzuktZssYjfLsaUdzXshdlbkGrbjOPlUhGMHIFeCbMY5D/faUh7Bg5vQY7JupH6G7DX97gyO3bQWW5EdO+wIUlW2hXpwjC7LuirHX6tg+iWl1UZyheuF+XU4Y9Ms0TEC5nELuvPEuTbkd0wbqbv6N4YG3GI4vZCue72OFrY2zeVCctPd53rMTP++Sndq5DSV3L0rKasMUxedz2Hc98oFKhdYTRyYteEgf2F5ICIg6N9bHu9YjLNSpsZDVa5Ppu7xOiy7COKz4Q/flrAImsthFt6LUF/Mf6ZTNq3LF0sT87KrQvHfNJcRiRS4djUjGWpioNfd7S6vovNl6bq8XBCKy0SUM7fKrAKwYKGPbqxEJQYiPCGCldkrBagJ3eIWKxgTszVqp7SODaEqIX6yLidAlmM4xzQJEccHELbeAfmZ7H5s6v7Yg4Vh+Pp594e1Kn9qTQZelfKBHZA9/zIrY6bfb++ocvKipty0DSLs5JLLGpBB/Fsj7OpIX+JT+kNI1to7c18yqC1vVxHSJRyRNedehy9yWdYxdbBKKgbazZQF/x3Qq29G9m3dcjN/Kjc1nCbRTs78YxNmTpgIZ6I5rxYDEyf+1Ja0zF4uWURnWg8zMpqWt4B/c8zGcjNJypqq5NRX++/s4VFRrW61uCAmEAFgyifElCV5LKVhSNCTb4KeYLhXKn73ZdWNll7xRteO/RYrhMqNaumakC3dfekYepglh5wUI/lOEIlmcfE+Wr0bvA4VYF0MPMDaqqTXCGq9Vo8vcGTKgUCLbWmNd8mrhc1Qmr3XFvySLeRUa2GQfp+IoXlw2h4gHhvWvEPe2ilqbTIGGmYIr/UdEtwOGYKk7wzlXf4OBtGpTuOuO0nIzCaQbVl7St5GqLym2ahvl3QTMe+A+O8GyY7cGxOEep5CpvP+vVavoGLaC8AwrrFoQiBUVNm+v+DsYbV9HdxiqJpdgqS3RlKeMHa37KSxCvtyno7tbrhEw16zKcEEmR8+qJ3UPHVPko4NyXVofvQtFtVG2r4F5KcTQAmEbzSOVUOyvfwf/l8iuDpQS9n32IWzkUx1LJ+HfkPtTdIPUdtF80YRkf671K5lpOS3TRerSupMTeboUh/dTNT5v5Vayx35rpkUmoB4Ih3lILN1JSx513LxhLdvIExUic2QGFQeYXzfSav0txeyTxVYzPYtULDVn5PdDxFWMmqhwW8G9kFGRZKXXHfVyU0pMpv76J3h6L2Q4e3Pl9NrCClGz5NQfCyHo2c+opuuJtQ271S9wPb3qbgSel2SPAXwg+dc/8+pnu6hrZpdS4FhIMW9pxxtYgkTrrNxGi69mvBpjP/Txuuo3YECZPZ3IzpO7hlEsPOCVjn6vVxQE7KUVVSkiAagrBuIVOTHizbS7VUeYDlaeycTGsaansLKR2/V7T6+B5XgqKUMzN6j2umQ714WTwtDtIYE6S+0vRVWxCAnKmuwuerm4iwkIpraz2/ybudOpErao1314RcUGVHxMO2ImwWmSpN8WOB3n5Q1dv9enu7ikSdwvmCBjQ8/5vlJikD6oQtx8ccTMHzmdMfQrHcJMoh7E5YK1xx5BEn3s/hQFYi2L90BYrp1+kQ+BBVyVGJWjnFPYAbOD0X0InLHuQRq/UQtPfmS5gUAXiquQFp/OT31K7v3BHC7NdxxHJfYTWaSADtvaI5H3MAuiYQqNxD4ohvTVL2FYFh1d2aoXKP7hjvPC8mSlP3SSsGdeJgIqMBWW8lXO+UoO/uAKC4YvH4nWti0amh/Sh8xGbpO0xEDxRAIe2CKJwcewAoJGUcMIYEPRRdtTxTxo8ncq0aO/s8PomI3UCX4vjWQHvi1TBQlqi+BocCHvUImIo6X4bUOCDA1iOE/5TfN7qMdMw2clkWcuZn76tjMNrPy8sQTRKXKIAcuKQwoAvXauCM0fo5zPIaG0AfQh2Odi5BYb5mkrvFNiLgjHbkMHYktoJz7gBCz2fWNiZDYQ9KAMJDDxRn2fCSr9bM+qEsyebTYb8egNQpEDtfI6U9Ngaa/h03OBzQAksNg6Yd2ST5JnZDlLzZl2us5Tjey7recmH7z19580GEzCW7dHBqXsuwQ0yWISt8UfqjiHqRNim6wwLRWMK925dVf03JjZJHPEt/GuS1XxU5UYjCnMYTcM5cyGRPOE4sAwWIx7GvVwrGZwBdI1uXb/TPynUIK7fH64Qs4xRCEoWSSLyEM4hLcELrUgHkiYivhoA1gp8sK2qQ32OAGMcio4nPNOGHn0CRoHBALoWDFenB6OTr7YRb6Zur05F8GbSXhpvCQ4+TFFetO6zdf7y2LtwMqhS4zRBysxr8jVMcSnTiSQTPQO/MIB3WrjNQfOuDa394UkF1IHHb/WqIPmBIS0Ct4Se/DEyicOZMC3Nc1IFeaVjDhGTMQ+BYr1doJKstBJtphHnFFN2jx2Da90xAcWfMV5qe3AKNr9mfqDu15DTaAekqGSHCFdOhzF9/vsZwT8S++olGZST5OrWXDIxwaLKTHxJciNng87oAHqb8pnuHQvnYG8scLrahOvo546KYL5P7UWRIRt1v58lAIHHM9FXt5FBN0m46huiuc5UGWrMFgVBPS4tRT2JvKReUnAvW3u74CoiRujF6ItTr74c/jOTI+73Knhy04JkR57eFmi4zVyWgBuE2a/O7ZEbc5zl8Zp1D+kXPyMHs1Dmk4/Esh/P5bfLYWuV0NMpP4
Variant 1
DifficultyLevel
725
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.0510.55 |
= 0.05×10010.55×100 |
|
= 51055 |
|
= 211 |
∴ 10.55 ÷ 0.05 = 211
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{10.55}{0.05}$ | \= $\dfrac{10.55 \times 100}{0.05\times 100}$ |
| | \= $\dfrac{1055}{5}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 10.55 $\div$ 0.05 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 211 | |
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
Variant 2
DifficultyLevel
726
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.1428.14 |
= 0.14×10028.14×100 |
|
= 142814 |
|
= 201 |
∴ 28.14 ÷ 0.14 = 201
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{28.14}{0.14}$ | \= $\dfrac{28.14 \times 100}{0.14\times 100}$ |
| | \= $\dfrac{2814}{14}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 28.14 $\div$ 0.14 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 201 | |
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
Variant 3
DifficultyLevel
727
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.0318.36 |
= 0.03×10018.36×100 |
|
= 31836 |
|
= 612 |
∴ 18.36 ÷ 0.03 = 612
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{18.36}{0.03}$ | \= $\dfrac{18.36 \times 100}{0.03\times 100}$ |
| | \= $\dfrac{1836}{3}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 18.36 $\div$ 0.03 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 612 | |
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
Variant 4
DifficultyLevel
728
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.12108.24 |
= 0.12×100108.24×100 |
|
= 1210824 |
|
= 902 |
∴ 108.24 ÷ 0.12 = 902
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{108.24}{0.12}$ | \= $\dfrac{108.24 \times 100}{0.12\times 100}$ |
| | \= $\dfrac{10824}{12}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 108.24 $\div$ 0.12 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 902 | |
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
Variant 5
DifficultyLevel
724
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 10
|
|
| 0.372.6 |
= 0.3×1072.6×10 |
|
= 3726 |
|
= 242 |
∴ 72.6 ÷ 0.3 = 242
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 10
>| | |
| --------------------- | -------------- |
| $\dfrac{72.6}{0.3}$ | \= $\dfrac{72.6 \times 10}{0.3\times 10}$ |
| | \= $\dfrac{726}{3}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 72.6 $\div$ 0.3 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 242 | |