ແກ້ x(2+16+24m^2-9m^4/2(3m^2+4))*2/m=frac{sqrt{6}}{2}*2 | ແກ້ໄຂ x(2+16+24m^2-9m^4/2(3m^2+4))*2/m=frac{sqrt{6}}{2}*2

ແກ້ສຳລັບ x

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5 ບັນຫາທີ່ຄ້າຍຄືກັນກັບ:

ບັນຫາທີ່ຄ້າຍຄືກັນຈາກWeb Search

https://math.stackexchange.com/questions/1776432/derivative-of-arcsin-frace2x-1e2x1/1776456

https://math.stackexchange.com/questions/1078370/why-does-the-square-root-of-a-square-involve-the-plus-minus-sign

https://physics.stackexchange.com/q/112959

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ສໍາເນົາຄລິບ

x\left(2+\frac{16+24m^{2}-9m^{4}}{2\left(3m^{2}+4\right)}\right)\left(6m^{2}+8\right)\times 2=2m\left(3m^{2}+4\right)\sqrt{6}

ຄູນສອງຂ້າງຂອງສົມຜົນດ້ວຍ 2m\left(3m^{2}+4\right), ຕົວຄູນທົ່ວໄປທີ່ໜ້ອຍທີ່ສຸດຂອງ 2\left(3m^{2}+4\right),m,2.

x\left(\frac{2\times 2\left(3m^{2}+4\right)}{2\left(3m^{2}+4\right)}+\frac{16+24m^{2}-9m^{4}}{2\left(3m^{2}+4\right)}\right)\left(6m^{2}+8\right)\times 2=2m\left(3m^{2}+4\right)\sqrt{6}

ເພື່ອເພີ່ມ ຫຼື ຫານນິພົດ, ໃຫ້ຂະຫຍາຍພວກມັນເພື່ອໃຫ້ຕົວຄູນມີຈຳນວນດຽວກັນ. ຄູນ 2 ໃຫ້ກັບ \frac{2\left(3m^{2}+4\right)}{2\left(3m^{2}+4\right)}.

x\times \frac{2\times 2\left(3m^{2}+4\right)+16+24m^{2}-9m^{4}}{2\left(3m^{2}+4\right)}\left(6m^{2}+8\right)\times 2=2m\left(3m^{2}+4\right)\sqrt{6}

ເນື່ອງຈາກ \frac{2\times 2\left(3m^{2}+4\right)}{2\left(3m^{2}+4\right)} ແລະ \frac{16+24m^{2}-9m^{4}}{2\left(3m^{2}+4\right)} ມີຕົວຫານດຽວກັນ, ໃຫ້ເພີ່ມພວກມັນໂດຍການເພີ່ມຈຳນວນທີ່ເປັນເສດໃນເລກເສດສ່ວນຂອງພວກມັນ.

x\times \frac{12m^{2}+16+16+24m^{2}-9m^{4}}{2\left(3m^{2}+4\right)}\left(6m^{2}+8\right)\times 2=2m\left(3m^{2}+4\right)\sqrt{6}

ຄູນໃນເສດສ່ວນ 2\times 2\left(3m^{2}+4\right)+16+24m^{2}-9m^{4}.

x\times \frac{36m^{2}+32-9m^{4}}{2\left(3m^{2}+4\right)}\left(6m^{2}+8\right)\times 2=2m\left(3m^{2}+4\right)\sqrt{6}

ຮວມຂໍ້ກຳນົດໃນ 12m^{2}+16+16+24m^{2}-9m^{4}.

\frac{x\left(36m^{2}+32-9m^{4}\right)}{2\left(3m^{2}+4\right)}\left(6m^{2}+8\right)\times 2=2m\left(3m^{2}+4\right)\sqrt{6}

ສະແດງ x\times \frac{36m^{2}+32-9m^{4}}{2\left(3m^{2}+4\right)} ເປັນໜຶ່ງເສດສ່ວນ.

\frac{x\left(36m^{2}+32-9m^{4}\right)\left(6m^{2}+8\right)}{2\left(3m^{2}+4\right)}\times 2=2m\left(3m^{2}+4\right)\sqrt{6}

ສະແດງ \frac{x\left(36m^{2}+32-9m^{4}\right)}{2\left(3m^{2}+4\right)}\left(6m^{2}+8\right) ເປັນໜຶ່ງເສດສ່ວນ.

\frac{x\left(36m^{2}+32-9m^{4}\right)\left(6m^{2}+8\right)\times 2}{2\left(3m^{2}+4\right)}=2m\left(3m^{2}+4\right)\sqrt{6}

ສະແດງ \frac{x\left(36m^{2}+32-9m^{4}\right)\left(6m^{2}+8\right)}{2\left(3m^{2}+4\right)}\times 2 ເປັນໜຶ່ງເສດສ່ວນ.

\frac{x\left(6m^{2}+8\right)\left(-9m^{4}+36m^{2}+32\right)}{3m^{2}+4}=2m\left(3m^{2}+4\right)\sqrt{6}

ຍົກເລີກ 2 ທັງໃນຕົວເສດ ແລະ ຕົວຫານ.

\frac{x\left(6m^{2}+8\right)\left(-9m^{4}+36m^{2}+32\right)}{3m^{2}+4}=\left(6m^{3}+8m\right)\sqrt{6}

ໃຊ້ຄຸນສົມບັດການແຈກແຈງເພື່ອຄູນ 2m ດ້ວຍ 3m^{2}+4.

\frac{x\left(6m^{2}+8\right)\left(-9m^{4}+36m^{2}+32\right)}{3m^{2}+4}=6m^{3}\sqrt{6}+8m\sqrt{6}

ໃຊ້ຄຸນສົມບັດການແຈກແຈງເພື່ອຄູນ 6m^{3}+8m ດ້ວຍ \sqrt{6}.

\frac{-2\times 9x\left(3m^{2}+4\right)\left(m^{2}-\left(-\frac{2}{3}\sqrt{17}+2\right)\right)\left(m^{2}-\left(\frac{2}{3}\sqrt{17}+2\right)\right)}{3m^{2}+4}=6m^{3}\sqrt{6}+8m\sqrt{6}

ປັດໃຈທີ່ນິພົດບໍ່ມີຢູ່ໃນ \frac{x\left(6m^{2}+8\right)\left(-9m^{4}+36m^{2}+32\right)}{3m^{2}+4}.

-2\times 9x\left(m^{2}-\left(-\frac{2}{3}\sqrt{17}+2\right)\right)\left(m^{2}-\left(\frac{2}{3}\sqrt{17}+2\right)\right)=6m^{3}\sqrt{6}+8m\sqrt{6}

ຍົກເລີກ 3m^{2}+4 ທັງໃນຕົວເສດ ແລະ ຕົວຫານ.

-18xm^{4}+72xm^{2}+64x=6m^{3}\sqrt{6}+8m\sqrt{6}

ຂະຫຍາຍນິພົດ.

\left(-18m^{4}+72m^{2}+64\right)x=6m^{3}\sqrt{6}+8m\sqrt{6}

ຮວມທຸກຄຳສັບທີ່ມີ x.

\left(64+72m^{2}-18m^{4}\right)x=6\sqrt{6}m^{3}+8\sqrt{6}m

ສົມຜົນຢູ່ໃນຮູບແບບມາດຕະຖານ.

\frac{\left(64+72m^{2}-18m^{4}\right)x}{64+72m^{2}-18m^{4}}=\frac{2\sqrt{6}m\left(3m^{2}+4\right)}{64+72m^{2}-18m^{4}}

ຫານທັງສອງຂ້າງດ້ວຍ -18m^{4}+72m^{2}+64.

x=\frac{2\sqrt{6}m\left(3m^{2}+4\right)}{64+72m^{2}-18m^{4}}