Number_2026-02-650

Question

{{{question}}}

Worked Solution

{{{workedSolution}}}

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

Variant 0

DifficultyLevel

650

Question

Which of the following is equal to $4^3$ ?

Worked Solution


$4^3$	= 4 $\times$ 4 $\times$ 4 = 64
$2^6$	= 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 = 64

Therefore $2^6$ = $4^3$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $4^3$?
workedSolution	\| \| \| \| ------ \| ------------------------------------------------------------------ \| \| $4^3$ \| \= 4 $\times$ 4 $\times$ 4 = 64 \| \| $2^6$ \| \= 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 = 64 \| Therefore {{{correctAnswer}}} = $4^3$
correctAnswer	$2^6$

Answers

Is Correct?	Answer
x	$2^5$
✓	$2^6$
x	$2^9$
x	$3^4$

U2FsdGVkX1+xhrAD/t3gRzZFjqSrc3A7nNxwrUiwHRi1aWwyVOazWEx53cVSBh7QmDmIIvGGFCGaHICBtbHNi2tCj0CN6g6Q+bh3E98CICD4oy2I2Izx0m6cWGr69qAJj/o9C+bwGAbJnWn1/CYXmiFpL8HVhIcxgoOuGuX8XeuiDH1S49b0Ic4TOQul/2OvVYm0OJjQBQZRTiKRzak416tI6dG4dOOF6JJAUaefiHUn+9RnrKFdyUbpRYT16SNd1P6t1/URi4OnNtKWS9r2Xmkhu5KxDD+haVWq1mfyruPcg0L+fzFFxKgNtrK1tAhrzBnsqzPGvyQMKypJoht8eptg6T+tHUbWfb7kS15Qwg1Lk7NoXlGEDWic4g5mNiCvulUALH85krP31o+LL3E8sQhhrj9lr5sJagO9GVx7Khri/XXM5itW0vDmEvVTV/WMJvibj/GReAWxRQCY2KrHm1cz2dHj0Dee21yxNb4AQcG/8CUjir4GQjCxiKbj9FAjBHadsA2xP0T9JCh4hmUoeBGNqAjIac7sV6uu+Inkpu4tPazNfBbabwldRJ2Dq5uGibh7i7lGtRvVhIp/NItWPklw9ttyDhsycjMjL5yVnzbScPi5GY06EQpzqoaoTZ4dS6Gqkt90/4bd2go42KfIq0/yu+tBHUpiPdW0ujZbW/mNgU9wDDwOlECmwcQYhen05hONFj6SzdIvq/MkHE8OfXJKNjbQp7MHnlFWyNsEheOXKPhM/xOfcA0lkVNI3gyiwyEbwqzqsyJu1WjRBfqpNHlhjO9ZwDaVrroe5S46IXkF0Uaqug5miVoHSzUxL6tSxk/ctMuR7bvi0bQ9f4Fsdwq+Aa511twSY5J/Cifycn6LNn+wsZhcRtx4iy8QXYgIfk+vj9e3pzO6I+uOHTfTKRvGG4Dj+gZt+3y/s37xOi6APgVKM1qxJGggbcUKxUe/25ONHh87zOqWlKnsgyDal8JGBoTPvLVrS5/dbnQQyb63++sCJ9+JUCX5/Of5hdCF7wCDJ1m3Io4l//A+oOLr9szomCIXD5cYGfNlEibgBO1swwBfqcpU5xq2Dqn0SpeY+X7pZ5KToRd5nCe+YXFAtMiTqK/G3jdyT9nLQvz3yDMx7Q5+lrL6D/kiB5bYHY3zy2rCArqQEOBaHG4FnqGkOt783UStW1CL/jrxJVPh5aFL3dTCXL/2RyVynKXs+vfwwbEb53e1yU1bNxcrV9o2Kxa7FSdxPvUXpnOdWxkshlWhaMotpmJhZU0EL8Q81/AzjeCG5G6y5RfuniT5iAS/QzpYbnERIv2ZD00Sun3LujMbL/vD/lH4Jjmelv398pNABhvTRAkeO5KR87tQsrcmQNegoleKM4LiwgxF8cl2SF1PERWTDAZDXuyVQQ9k7q2uRtVOOIE1eIFfQuPDIn/OL4iaXjcZiLOYUT30yc5Y96ytcm/FODZNfAN9eP2QczgItzXqujljiSePPUGc1PvR+MS3ZBwwbW2c+2Dlb5O1BFPXzCoH1dWS63peSwcHW2eYENVq+HSdmFWE8KxnDxZLlzfuHZuHafsf1BoQ0Y1t2q0phEdbByKVNaoYSCw9azpFJ+NzOxths4Zd2ALtrITE0gyFdWQ+Db8Z8tf7GlFrJZUtm2vCytDt5RTMhIn0Grno5EdkoWdAxu6TgztusGTGdFqO2IdThEaCScYtOd/ZULmkWmXeEFq/iIgBSgP1dzSP8OpBARMJB4U+6sAaHHsKUHx0YBr+Dz8v6EYtvN0cTknMXA89DOVDftNKekJBqThKQgnDem/lxCO+eJDVm7z6S+Ez2SdJQtHOSTWhD3LNTa1oes+oyjCXNC8TbapoAO2p5Z9+fL7fW1wrFsLtDMek0H4V9gPpTXoUDHtZnqnh6L41P/SXJ9bXV8hH3U0mjOt3XFEvfk2HpkJyTwqlNa0qXijAHbuQOez1SzXLEvDpagi/vXnQUWq8BSFAI501tXKkcRdskbo/hYdxUd2NbQv28Mamr0PtYs0gXGzK4lN05AuMXcW3G/FTbQX3mpO6tueqb3Ox53i0iEJkb/Sw7C5pyCwkCJjq7/TyJzl8YEWrxbZvpBFX7B19Xk7gwNOrgsYddq5KyRpYkvzqeRC3npIKAdRJqlW7BEXixHlN09F3dUoy40J5H3zRNyyAT8X9dwbcRwpGw0F2Dqu25lgl0JW4lvd4okKrMtQRsZ9UBDdnE0U/R4qUGamfe6spOu6hKsDTX8oBwvSCDN23UiyLdy3+aIkWRkE4lnDnU1N5HQVlbKgjw8VhVd1WuSgbk6GPkityyCa4ckOsYt22JU01h/CtCvCNzIQVPPUqfY/ynQmhlX7n9CWFlCxERvXnUc+IbfnptfyiRF2Imq+o7NExjbrpoBSSP8mv0SVjAfRgw+lHc0C3CA5kztkrLupPhmHwOpBELS+Rw/vNZWVhWPhHHWimnycnivbvrnWGOzp0mKzfU9b7q9Z4XS5wAT3cKiq2EvxEVY6d5aTV47CALSK41DONMGNH9Kdl+1dGRuhiVSYPatn/mobaPU9m5+QxnXYlPDTXPpV+Gl1ABroS3ef8U6yQtNK48AVGTmFKdjCmr0YAGaDVWZCOHMN0YdsxvCS+M0IRSMPvnPnZZPQuuG3c6slYfEgLoPCM2GKCDYa9zqIoZeN5KIugAds2NZYnbA+5hizAhT3xlhGhUt7z2Cn+ctdwJb5zUSLqqDrZArQlrkPS0YGaKXKJ6IgzzqgOD0LoGYSwDa/1vR52psrGpGXejiaahIitBlfQoVSCpuF04dD17dxSeMV5p0C6EeWDJbjmhtiMyPDNPcSgoMTB7scK4tZQkjBI/G/8n8nKFTRDE6GfvWgVlPRPkvq2x20GzIyUK0iwDDJfA0UQsKqaJJB/ydGL5KyDYV6tRAXEZLQiVZuE7XJSeg+6vx9mPWpJ+nF6Izfe3QjqehskLTLpdroY2iEsUPrTNTrmUyUaayKW51u+skxDoQqof2i0LgqjMpytbYWmJeS71Dc/CdIFrlhsaTiq2nzsGM/cLDxEaFkeqe28trAS2F5dm9gqpDEbtxcEo5UG20f7L8CE4BCIdsfKqGwdP8dejCDSBHHFJoL99NoZnLuCPASsCSzesxhxbnEg4/zhbW9Nrt3YTMWfzFy4IiZqVrwUP+BYSM4q09sHAZspWUsdlpQbYLK0mBSRXIQYakPPzGn1DQiBmedosD5RFmdQm4K2D8p5SseIAn2FcVXLVZfvfCQtg5/OdOQIk1ILbGaIMshECUWPyeLyc2d/Vrb0DstHtx+bI6MkGwFz7vbfIIIHbpa1ekPFJv93Mavf5+mwNNJ4ZL4T+MUrYlQ/6wfgoxcXdzDhGYqkLnXceEeiLX33hdpYzEpUvt22IAQEm750S4v/44ebKPm9AnQ4/DnCjZA7IRUJgs/fmLBq8F+K03GZIbRVPJ4AdeypuxqCGrXeZiUyUoam92Wj2HWRsUeHL1KXQW5d6vt6t2+Q5STo1FN5ukHS/xaJxTWY9z/Azm59cIhZ5N7Yvv86IEs9SbMiRSl89+m2YwyIhzJVQxeLLn/+D4ZAe5d8LLyqJPqHqHzB4vzhEbhXlQ4kl2rwxikf6XqHDfeBkJFl/LJ2FzoiArXj7XS2Wj7XiyXtylvm0cIvXonSpYnVxOUhoOrNcGAD9axkCjREZXpNemN7DWHUh4jZ0qIBLASAqa/Ng34aFyevBlJM4t8BBjvxbYBTCyQ07yGZqkSj/iMienmhJDMndHjWqWQNBvaKeJcCW2itsuoRqjZPeHrxaUG3wrDAbiwYgnFytX/l7od1cPHZrgA7FLpK+LhagxjKY8DgwYZVOJpHV+72b9ckgkUwUuYlApDnUgixywIOzSILsJBoQ1Zs/RNbM9O9x66OFTWMpl4Dw9fMJM8z0jXojJFmMKppoz5WEqkGPJ9ImYi98Czd7F9Si373Gg1QDwF1R0Y2JGVw+sQd+g9YAEtSJYrnsxDtFpdEnY9gLvgB8DIl9tNi33VvJjwQGfHxhQt4OUeI43+kyrBQHxO8h7r27IsjnmFi9mKUUKzO2O+/1I5hZ2mn+Jc5sooWNkpMX6q7741HzadazAK8uT5mfu8jKm8qbWq+rs+68eBCERAKubBIVm3l94jExyfnrbsNcklIXR2LR1W4ufSEUob04C+CinHH0oHbm4xWzzK0DybuvfeZU89g18frnmwjv65czEKXkNGImXjXvY+ESWBlgoBslDHvBU3JUZAyRJB0ZAr821yaVAK1ggN+2N3eFQHPgTr7y/+jFWPTPwU8VAl+EAzF+ZVwMnTBlO3PIfW1G/0weXrfIajHId+Za5ExPv9m/5B9VkHbv95PJHXpqtoJ/RHoCuEa8lnUfwG37W8pttDiVod5w9mCuZjqfkDqNPovwuR/f3NIL4gOZU78Z3hjRJumVkFYgRI4KNj0VZotJc7eNmI/HXI4B1Q65tlRIkkXigDkC/dLOxciLacELhYcfJvUOdXbDxXTEtzTVtmFQtsJw/sNRxCHJmSCutIEmyMKvJ/YTLfvSwzGn0YpHmh4/CuEkvxOj7n6Rx/4B4XUtcSsLE7G/aMe42NM/qKfrYmaXKmwSBuvUVf1r0/XnUft9zEFmYuGWQZIM12oYIR0MMf4926HTkgbmdyVdf3RzZL8+ej7083vXc7H1M/9H4AW8LdlJUroOjnLaW9PQKOPpeumSDAlbm0+B0aTySb+z/3y24+lJKZTjw43DxbvJDucY/WWd5j5FuT6Flu+TGU2deF24VGCy+yN9GYN0t0V1943M2VgnXXxjbQQL9FFZN38Qv0wgciJwK7EFEqF3tPWjDTGbe4XcyBr4rjICmkrReTsc0OTLJMK2K5EfVxQQ4AVld6nHJVYtHkWGGEjQOx8Lbsgn9J07IhblLN/1KXx4PH1gPtETY9Qf4+nrJcvpDhi+g0oLksJrlU5/jG8oPIdHKW3M0PF86eilJp8qtez5Y2wQqtrITrsI8yaCnc8YKh1YvZuLj+Slh6ReO2/nqi+0ipWpFPXZOhbT1Kd3YOL3s6mBg0tJD+yUTqkmfKfjyKxwlCL8x1WYKmaGbUkkfPUDwQ7W+HI4Rnc5hEPoajoWNmMAyX1/pUx60BtDl4hbp93zcROi1h8nidIqoVg0IPlZ6tdH0xwNH42ESO6J7VoaFQM2qYQmHz0z37Fyi73230tvH+miNc84fco94ExMFxO5KxzZxZ6On6QcXfWUWRS0i/TXJIdjS+E7GeLqKvms4wisL3Y2oiIH/GPGmcqQNd9EvMNQ+pPnir3XE14ut/EdyDGW2vZhAyHGFo2Q2VejGdR0usPwvsDRKSvHsrPvBAf25Foq6VzvBvBQdGOu/voJnO7JdB06MyPfRJmpSdpQZY8X4kpYS5KMzmXyVgY16rokiwjztEUNgh8x6MZFql+fr3q/obNMpItHgpM4Zd8oaq98ts4mKMVlnhmziPumwDdkTc1KOhjNZHWoqqXf55FMDTUhxnBZ0VQpNgSDO4OZ5Wsr8no+4AmWX+CwFp5pZH2YG48WvGGtMXEdVcAyvB8gNdtW47Gdsh9Ksz1ttf4tR4JIJWz9jbtEL9EB4W+5jZPoy5PqyZA0rJGgyXIGEy3DquJQ103KOF8HZkOeVhFxe4kN8Kz2C9gxbgvzKAh9UHRiqltClGL/NXayR9CMHZrRD6P0jciclNXCpIQlMhY8yWL9RRdiv1upzZFwG3rynI2XRaMYEwpeuSGi0Ub93Zz7RURwSoqdwizetfUFTnrm19jJe0G/KniukPbBs4brmQiVYn3FyEnpDMlM6uQjMqT/7I6JB8WepP2lZvOyDdBeWzZouT+CvLW4Evsagg8YA4gG4IMrwr/3fIAZ88exAkNmalc2LJtNzbqWyZjnbXxihoZaA4hFAqgTNtpc1tzA5zMa1I0QKA3jRFPti3HOaVGxbDcbKvLx1fEYAiqmnYOG6fFeJV1xclurrrYCZw/nVVY32pUZhHSRfewHpPvYEV2QeqRx764a2Ba1cd0IC/+EFDRxhLUvrdcYv6F09PBJr/+K/tgOP57r3iauRJB9Wt4Rc4Kl92uoct8z5uTgB6Sly56LzfUejWCAY6F5HeX8/KrVwWO8YUU+CyYX7AkBsokiyVwAsXXIgO5GixOR+0ZQITn7npSV+b/HepGGd3cs7GoTuukt3y68EK+PHuQsspD9rMmE3mjolM9W2twh80v0qZRLLLtMuSnCDMUyARJlcSRCh0OxcTl1JP8NO/b0xXspYsba8/OHASXXthIJTbSnE1n4JJpIGHUBSRerA43bFCBps+8BGE1hSPqe4j7ApWUvbcsAAB/qJcftIypPZloEcHJVKgRdXXdU4P9Tivo6xWDalh5YD/fD1srXVF58QaMGTMzaVE9d/22llv6K/2FX7yqDah0SzFO9LEwTcbxUG0+5tiR7+uJbi1xjExJmxpy2eYt75z8ySPG0mpw7QKOAERTFa/5kbdIHvlSTJFD2q8KvRiKnFSHNs0E2aNjZSUymDSz1VnL2ifZPQBI8TqoDY4e20I0EUogOnc3jFiJcQHSatSwmoasawu+NnNpI6kDnpx3hY2jsjavRr848/Ln9rd1PLcfs6Zz3+8C3h5b0OXQr8TFfJY713lGZTAgW+WKQgRP3YxT90b3W/sLvXPEI6IkSQ7qZkFZQ49nLl9aMuLsuvm3GPoZ2/y8P8HT0ziyncGhladQxepVcxdn843+9SwF1DHqR2w2OeD/9B9s2icc/k1UHFAtZRVi621HLoW2MytGA45K6Bvwa9jFRNoP4AYO0YyizoGfp8uGPOK3WD05bibnHXerwfZMQ8nNMsKhJmm7PrMP2jyIaBN6xQM1rjzKAz/dwRkZZIug7dKO7NUvI/I+rf9oR8QsrgHbz/fkBIvQ1RTQCcTuyVHKjjVhUKNuAZoqIBEZNGRNi6Bu7JroJnUvP+zJ3dariVybqwhUcUJi13jPlpGzg360bD53mNpc3h9fPbaE4KanRdBgLOVpiYrITFcHGPStkcgOtcD6ePznd7tXz1nA1gESW73IhUHknb9yGBLCygtQkq0Yw2TbRZijCNKGWmrzDnTABBmb/bUz1nBfd4X8DyEovjOgHB1vTSDZUHVnotcu698aI6IJNpG2JsrU2EW7HAb24QxNK0nQNkGCYFJxcc1v9Lgk39hvrjMKBSLwyGlUQvULT3wKCZ4T5yAox3kGNwo1y1VtqukWspw9TeQj+ZkOnepmzzmLA9kBW2Gl/0yyhhoQvglUlWkD/27LFf/YV2dw+3aKJOzjmGx7Z1Xz5RWKsXuZiDs3/fJ72ggvEUYrZCQ/jttkKrBnCWExPjkOX3TWBOsIn5ra+5RVXbHRVm9RVcDAitVGGD2OHB0ez5q9pokT/MAfymEdMk1v2EI6K5lW9OdiDR1u8JRRJT3R82WbmxRqLtwU2lASPagnvIzev66d4foPnoOuAcK3ETa+2MSa5uppm51fCPIsGDXcbJlU0Ar0SOH28QPMI4sFjSPlVe7jLpEqaLAHr6xXJ+6M91rB1BmR6+2jKpVlirCwhASQvVcN4PTDYyUf/EmcRp5zyAaX8Zsrl4vmC6WeLxDfrIfxA8nZphlwile9RCaY+VOdjD8aBSivyraut8zKejee+/ye4KNIY/qY2P4Ea4Yt9iVIuBZ0BIryjVO9cYAW7HBa4pkyapM6xVzS2qiA5FSPHuKzAqwVwUwXwYYFlY21BQM5mW4UofPiDV/CtgTTqUCh3tTh8DytDPTKRy7yD5fhEQd7TijIT8U5lxSSt4D0uadiHMDPg4DLxj+NfqzKG2P3NIMyaDak8PnFlKqA/C375bRhnXW9sQbuiK5OSmXYoTvGpcwOriPtdf4EJ26pTLOQfpcjv+7lHKTIVpv9NLRg4x/rhTjNFb+H66FgkyWTnNoUyeTQwQ01NnIgfnYO8PKoAqDcqctAh5V2uRgGHxeTxUPKAtpklLHpgI6ueGBZ+VK53QpTJj77UyVFrANJXIFOEIK9RmH+2rdmrtgXNFaIDDjjMqOXLlawea/A7nOAIJl32U5yGxlZQCH/Vfu2Q+cimW5zTJ/lc6DgKGUuSthJUwqALvFJf31uhNTqChkAvjgVFZOVrfMiJ/6ZP2cF4UHUa4eLV8gzLeaWzK8UokzLEwycvOivLcd4sii9oxZgU1AZLJkeqnaKcIYxFuvE+8gW5uFwrm9SRQ/CmfBGydH5fFctdUYwqVq9pVM8RL9iE2+HNScZUE6mnHrNjyZ63QBWuKl/H69C4kHFrzrWC5XhhBHMvx4+QRSPeybpI8ig1/jviWfPZhvXWQosi77E0OcwHil/Rugyi7G/7J78ZrpGf/gH+m4QJKvgW5sTJ7zw8aoy/RMOGp2xI/9wdS0aJxeST0AOuVM2/693/07MwWmAuNpQN6G6eUnvg8ZSBC+7LDCTnKOalPAfIP5lO8dlS/o3vGXpEb3o5OpWVfzW7XejTPk2/vfo1g1vm8zmTCD++ahiXUNtbD0tk003gUBMKc3BYYyz0vLqZJx+/FtXMVw6Lwbb8m4K155VEFZ3lkVv5t0Ab5DmZnTghheml8wiu0gywqqvY0/pEHscRkXpeuKvBIi31llEPez1i9uq+s4yBRrQ/DVny7yVMGyMewaeZNeZrdkqxDCw3+hVP1MsLFwpaGkzYUiRUFdqb5nXrZbJb2ihuKYVpi/n78EhGMDhieY9guGuONZmwCQWjDPKn8hYYPtOqSrszgLr4tf88p3g8PuQPB5iR0+mnsDxLBSjK0m2HUrZVKXPG2d4Q/6a55CNrYlr3NpIx6T+U43pXwDzjWk3Rmm96oBF57qHod1Uu0pofGWc/sKExujwrfq707HvAMwdQ6SyNpNQN8FsUmkaVIFR0vk/vfax0X/DIDLOkTl5mwMApiax6DWp0E8pOu2/PTUkQjMs2pI6Pqe2Ss1eNyzgoKZpZYcviTslw2jCJxjzevRuOj7KmU9HW3I80fqCqyN9RTsNaIJK6sOacjwcP13dkloec3fLKTTKzgChBSSXv8dAC0usjTm/N19TKpxu9IIukwHRzkRNzEeQcCjMt6GV4wU+m2xfIbBNbR2NsEJ4BNItgQFdLnEIo8FJh6sLBok8wVAfaXKqpew0qBLcbkpZfQYao6g+nzHYIyYr1D1lmWasgH9ZKnTn3XWkFcfv6fDc5+jsYWQvWKchu+Nw416UkqpgLr/WSzzBwVRirgtcqt2P8fWPxVN77H3dt99S5ygHGhMqM1UnQvA8wgm4NgP2itsxUIBI9XB6DUGBgTJ0JzCPHyLH+Mhk0orL+hZxUign0iWqKmQ1u3LhkV+ukHKNFa2JgCDK+0ssV+R7QO7ItyoEIBL2s8YHnYqs36XO8CGQOsVxnIpUO9DVYxN2Gh9AyqKvBmm/E+PFGJm/5xUSLlT2gwxA5n3dKtDKIYuJ+ujnfsBY9JOn5irX4u91PSHI5on5rkoz8MQc+TYwcn3JRVp93fzMxFCwyoSBdK2SFxLpGYURkphXB0uniDInRyRpt3Mr4+rWCuOrOunT1mFDJJaIkHV/HYqgWDCU49iXd9WY5wEOvZ4loxQJzbC/qauCBUB9I4no+SsJn4yfAQ4bpp3iU3DnpRB6RAbWRJsIK3/OnvqO2gU11Hc7hZ9qpOqv6+XxC3FRBpkst55ziFB4zrzKH12G0purE8cePIjCIxONgErbysLkSgVJ4lGjjegCQuYGfHGYSrxCHBru3XOrrGlnmJxoXgzIvrDyCN/jbtLeS0Okn3Ev4Es14Uomg1DA8J/tyAS0G8RqEQaqRWvRWBmdGx+bcjWkpPOoXXa0HCFKY/H9HG0catva6osGuRh/OnSAvOiuGutBzHI78CC+QBi4yB86dTw5aW/dIJ/ABZxVVIoiY2WZK2jyS/QIDNlmOQjuMMXI3OTAgWPPrkoVXHOL7N4qFWfQCp1THkI8VZAvi6WC1hkf1IC3KVjAOdKdEM4m5aOTMUAC2/0lg25wz6DADtFAz2oMfnwyNb3Zcn2ZG0G/9Dn7F61Twt7PoDHmtXRcLvWtfu074oW45yS6uUMy97dGtjQppF13f11bQa80dGMdynFI/Pn3beF6N1QQYae9BLgmHEggLGSqo1vSgyRc2BVZrPiPYYuas05mEzKTWInySfByL1wCVqtzdLZ1A47UGrtcOLakyAm62nmXYRgNLtNZ9C9q4VJxNWI9W/B0h2OiXpWqbah1VmLIxs3wCsxbrkaCY/n8JgSEcNXe3t+9ZMYg2rJ7x3v8P3vk2jIzDqd4uYE2D/J6iHuEYh2RfdU76ezL6bLoiL1b65Sh8ks5hcMgIpYw8FBqhHnGJhA6OoqZyK6YZl2hRZCoKLXAPUlgA87RMdGw5FG4ZUuyi4unDYOaLSL3a+KFHBKcsA/NS7ttD0xRTanwqdPjjUXfCrhDZga4Ov5DELn99BS9pPWtulsVGhjyyuzjuprEvv8dgEcfx4r9YG4flqmkk4Wq1BmzaEhQS/sz7SXJbE4ZXdAzG9mfFy1stgDfaMK2hknIn475dh5XeiRayXDtuBx8puP6xKb7rnM1j31ZPVnZdrDpJfLtMXSp7Nfe8w0Bm7LDB/YGKDU96uLBD4keGOpxzVBj23NeBRtHpQF9XLTQ9hGkWQqjTBkN9x+BXwpqGqFYVYCqy3nZTIUFvmFpIicyM0TsVS4We59PZ74o9szRZ9XsNxuZ+yb1evnXCYQOG4KBfIDg/3NZodhLbeOdL6h0YVKtyewQRUWsi1LGev6ihfl6c/+R8+CNmKTAPXs3/6X+B7ifLMGZ+hVUXOMNFAjMVHHPYnnnwesuHvJj2qaFlfb4IOaR8qtBPvpafo/JFa44CivIF4gUYrTY0d4lvSGgfHGBL00ZVw7aFDKDog0cjQB2TMGZbEFqy6gcEyRCDRuw6CJLQUtNN3xniE/YQQb18BYcgm7s5o+RHsyYsh/B2DOvuOLY3VEOM7noniAE2TqL5Huo5ALJwzq+f+EUjaXJp6SkIASoyEEwXJCEPqqHMHCFQPf2MPWbQIU4XnT3WcOLskwYik0gm7jD4F1soF55Bv6ibB4CbgDN7LXdDQO9yewoVVxfXisATN9Z1sSnQrjLK6tQSB6pQBTDln3eZNoHBg8lQLZxHw5qIdnrFJJscdhG4t6G8FbTMD4IHsCspit4N2QT+SftWNalkNF7hO0F02MRXvN90lSDUMPzYYr8HjbXU6ePZLawXXrtDdj7Xk8CkTEamS0FOzxrnlDh6EpoWCDMkZ/RRGF2OrYlvPyERaNYuYtRNU96DG/1ZBnzKTiyqwhNV72bamLddLteg3Ubp8uv+Quzoco4IQBacpRJrExKeyVTVufseOf5vk65li19zNXwl1HXup7ZTsaIN2KIs8gKio3GKBcHDe+s3bjoMOawQNdgvD/qs92DwU/Mfr4EXgmcqdPv0Xs7P1a08Cz0/8CaRaeF3U5BjlWAbDTfXYxlxw8p/YCH0qzzYH6cb6i4zjyLClau8q7tvDcI+4SLCzaY6ZWTc+cr7YpSsIAfx4BAN10SwaP5XOc7k0K0OKhn1errMJ+J4ROHnkpWF052y7UtHNABKNbZiv3za6/uopAPcbyQFROzBWTlK/vU0adOiHPnJsQcUNAEvmRMISt1QBH8XysQt34v5eLQlRmV0O4nHtt9+UvXTg1ALlxuxjqXbC12mYqa1g095ZWVNc/THEIokjeNk9tUkcVhMAgUEO7vtLzJuA7uzUj7yof6J0N23Oh3tMqdIGMwlYSrJs4p4a8YgJCL+X8AC6bY2zJ8c0g/BFnTyJLMWNjk/o//YzWM8uKfSHB0eoV8dKE2edPsBGwjEHdWtbIvsqEEhg6wu1NbL5T95suxYUCUI3JLaDnDB26aDsYRh5iZyxaweMp+4e2mkP7u0RZNGPhmDPXhH6wyU82poyg+V5vQzJFpSp4yGqawRqp1GYGbGPhuoYKLO0/nr78cNPc0K9mvURHSUPUDoKDhpeStxHQJP6tk24/usQRk9AqZFJD+EId6PFcHRFZD5ppt29vDqz3mGLJhdz2aRyDiAYpKwQ5/QJYynY+eHv/y1L+e9FwvG7qir3mRZ1dzx/hJVctNUOdkXJif7JDFJJxorGh3vPY7vL034VIiYtFzSUiaU3u/9v5iRD/7ngekvP8fKVgoqOM5KeSViG3tK0O49lwApw0tTcUyMgXOvz62dLwHEjMWevGaevhBl1RwsPZetd+D09uhs4z3tFQhkAa0j2EGLx44x0zfHCtyLZgFJcMXRvaHaseyIKcxZT5EOy4S9Ko3DlwjHgEaage/Z/fHBn6JZpaTaxz5Yg/lgT3qeDqZxV9zFKJAL1OTT/0PB96HKzX0+pHfB7bbKzUL28m9vVZxSzM7ia0+z/5xBmFAsVDnzeZSqATqHUbxc2saNyqibH1dRHZ3EEMW7+WrgHLRp+fgJEOwutYsVYSPHiZLIzEHI3BaLhlyttRdkp+ZaxDMKJ4aof7m3D1Hwel4iEexmquoY+NcHBS3wbTf45xfZgPwK+UvQMkpCaUjU8wrjq6f8vvNVK7QuS9UEKxodxItmY2BOlyHSyNQ9yRR8GCqV8KPf6A5ZtWVkUSjqH/QaFRJ6mGxrBVsDiubIw18yTFRugwE7Gr//N9pJy+j0RHUKU8EO1KfrzG4aT3h9DFMxVDe7XiLy4TVPNuvkx6UNZL23jWo1PmMc3Hgzvl99sR7Xfy7BfJ1SqZGUKbKJXKhUnnAu7chauscBL1fpfvHOGHePbwCmBB2VBf3JRhSqx1K/AFBYNuR9cKez0zVFrTvxW0Adq5Mz1R6BwQ2Q19PeinMl6PygHXsa8EdzRmdSpEAtrwZpaPGOAR8U3lrgEtDhs3g4j7Bby2rDIofZuoZ895UHXGWC1mC7LKeuzuUvQ2KWyKkCwhhWXHhCMAbl7LnurbdoyxTk3vKsJ7B5gkDJg0tUS2+mPjUkb90gcTp57GtJU1adPiMKNqV7oux/DIlBFThS1KLgXodat3YbsmgkSGRAJQIqjKVP2+EwBV8suilRNL2KHdlRqTUi8kj1JoLApkekYHgq2BxFS4sMgTOLKC4ojrObZ4v8S/Rtm1wKsYbyiJDKgzm1PUR9dXePA3jcHC9thQ+ZemHFq1xV53CaudEBQyWthfSeM5UwWTP2jFEOBUZz1m6HBt8r4T3N/w0BepZUAGO5gfSWZsoz/afbnyFKu7JdeXii+uasTD4tawYW5YBoDLnLroVk/sJwBf8PdBTUDKQSqmuVOx9mXyFNryTx/C7qMzXzGHnQ15OJejJwtklQPvE5NlKK5aCBd7LQcOK5RiOdM4gXvMb4rrS9OF2l3ZV6OpoqjpGrMHQsBV6c0YMYPob2xZpZzdvEQBNpFLf9PLq3JwAOPf2Q103rYTYH/jfBon/OxAD550Qred75UXmSz9I+2AxUpQftnf/1GBtsB9xesaUjDZp29k3cKyACMCdfY3N8Blc3P3WmwLuhnAkz4neGIekzPV0lfesi5r3iM7q8UA4bTPXqY/oc1phnXjFqpPNQfXSeaKQma7eKr8uYnnUO+DQ/Tf3a1bzUGtW9fw0DVFfVoTmffbcI3TJGdq7z/A6XsGiOZx0grYwFsENAwW615KqHWB5NZmPxJNQDwP0WU3FZ713jDIqSqzFFLtzMSe5X9m1OE/E3iGEmBXw0AnY+oMIFm7lij7x7dYTuogJo0m5ZKsoH6337DPKXNlOooov4ZDcc34yMDkDKlZPJJFYxTtjrEGf7DVDVv8ojgaRfrD2bR/vjR0nwdzPLbLu2I6ce2bYQNglNIRnQXyjTw+LWgOlzW/ZqQZmGeUqhCWLe+xHi2jpck/EMdnH/zDUB7KTewjq0wA4fhTitm4etf+6VZ0mWVhQaptoWy5jXhbfriLhRrPLq/1YH6G+OhqMMZ9EZQEIYSLOLrwGz9QAireOKPBkJ2pvb6UAL7ltGxX0eVgiVrlnLG/XSzNfVAjvjU0JPRgogMpmcbAiMjhja8wda6Duq2HD0bovVNn0mHklfT1tvT0m0NUZqWR7YL1dw9bNy0KD1rQ+d+FNgb4mXeo/nRVIfWaTfWgmuBtaBgdOasOIN8cx5+DTronWc32GLuf5I9cwzqj93XGvsu2eiXbIeqF441ZFtiOmASAbvshJ8htaL0SkpRVvfDFdl0wPL7VsCOZbOZkvOWX26CX9F6HieZO6Kq4Jb7jJYSqlP8XZeWAjUEZiktFeKIgxuVYiXOvLcgcJ2t0/cA==

Variant 1

DifficultyLevel

651

Question

Which of the following is equal to $2^4$ ?

Worked Solution


$2^4$	= 2 $\times$ 2 $\times$ 2 $\times$ 2 = 16
$4^2$	= 4 $\times$ 4 = 16

Therefore $4^2$ = $2^4$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $2^4$?
workedSolution	\| \| \| \| ------ \| -------------------------------------------- \| \| $2^4$ \| \= 2 $\times$ 2 $\times$ 2 $\times$ 2 = 16 \| \| $4^2$ \| \= 4 $\times$ 4 = 16 \| Therefore {{{correctAnswer}}} = $2^4$
correctAnswer	$4^2$

Answers

Is Correct?	Answer
x	$4^3$
x	$8^2$
✓	$4^2$
x	$2^8$

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

Variant 2

DifficultyLevel

652

Question

Which of the following is equal to $3^4$ ?

Worked Solution


$3^4$	= 3 $\times$ 3 $\times$ 3 $\times$ 3 = 81
$9^2$	= 9 $\times$ 9 = 81

Therefore $9^2$ = $3^4$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $3^4$?
workedSolution	\| \| \| \| ------ \| -------------------------------------------- \| \| $3^4$ \| \= 3 $\times$ 3 $\times$ 3 $\times$ 3 = 81 \| \| $9^2$ \| \= 9 $\times$ 9 = 81 \| Therefore {{{correctAnswer}}} = $3^4$
correctAnswer	$9^2$

Answers

Is Correct?	Answer
x	$9^3$
x	$6^3$
✓	$9^2$
x	$12^2$

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

Variant 3

DifficultyLevel

653

Question

Which of the following is equal to $8^2$ ?

Worked Solution


$8^2$	= 8 $\times$ 8 = 64
$4^3$	= 4 $\times$ 4 $\times$ 4 = 64

Therefore $4^3$ = $8^2$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $8^2$?
workedSolution	\| \| \| \| ------ \| --------------------------------- \| \| $8^2$ \| \= 8 $\times$ 8 = 64 \| \| $4^3$ \| \= 4 $\times$ 4 $\times$ 4 = 64 \| Therefore {{{correctAnswer}}} = $8^2$
correctAnswer	$4^3$

Answers

Is Correct?	Answer
x	$2^4$
✓	$4^3$
x	$2^6$
x	$2^5$

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

Variant 4

DifficultyLevel

654

Question

Which of the following is equal to $3^3$ ?

Worked Solution


$3^3$	= 3 $\times$ 3 $\times$ 3 = 27
$27^1$	= 27

Therefore $27^1$ = $3^3$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $3^3$?
workedSolution	\| \| \| \| ------- \| ---------------------------------- \| \| $3^3$ \| \= 3 $\times$ 3 $\times$ 3 = 27 \| \| $27^1$ \| \= 27 \| Therefore {{{correctAnswer}}} = $3^3$
correctAnswer	$27^1$

Answers

Is Correct?	Answer
x	$9^2$
✓	$27^1$
x	$6^2$
x	$9^3$

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

Variant 5

DifficultyLevel

655

Question

Which of the following is equal to $2^6$ ?

Worked Solution


$2^6$	= 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 = 64
$4^3$	= 4 $\times$ 4 $\times$ 4 = 64

Therefore $4^3$ = $2^6$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $2^6$?
workedSolution	\| \| \| \| ------ \| ------------------------------------------------------------------ \| \| $2^6$ \| \= 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 = 64 \| \| $4^3$ \| \= 4 $\times$ 4 $\times$ 4 = 64 \| Therefore {{{correctAnswer}}} = $2^6$
correctAnswer	$4^3$

Answers

Is Correct?	Answer
x	$4^2$
x	$6^2$
x	$8^3$
✓	$4^3$

Number_2026-02-650

Question

Worked Solution

Variant 0

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 1

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 2

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 3

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 4

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 5

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Tags