মূল্যায়ন
\left(x+\left(6-i\right)\right)\left(x+\left(6+i\right)\right)\left(x+\left(1-3i\right)\right)^{2}
বিস্তাৰ
x^{4}+\left(14-6i\right)x^{3}+\left(53-78i\right)x^{2}+\left(-22-294i\right)x+\left(-296-222i\right)
ভাগ-বতৰা কৰক
ক্লিপবোৰ্ডলৈ প্ৰতিলিপি হৈছে
\left(x-\left(-6-i\right)\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
\left(x-\left(-1+3i\right)\right)^{2} লাভ কৰিবৰ বাবে x-\left(-1+3i\right) আৰু x-\left(-1+3i\right) পুৰণ কৰক৷
\left(x+\left(6+i\right)\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
-6-iৰ বিপৰীত হৈছে 6+i৷
\left(x\left(x-\left(-6+i\right)\right)+\left(6+i\right)\left(x-\left(-6+i\right)\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
x+\left(6+i\right)ক x-\left(-6+i\right)ৰে পূৰণ কৰিবলৈ বিতৰক উপাদান ব্যৱহাৰ কৰক৷
x\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
x\left(x-\left(-6+i\right)\right)+\left(6+i\right)\left(x-\left(-6+i\right)\right)ক \left(x-\left(-1+3i\right)\right)^{2}ৰে পূৰণ কৰিবলৈ বিতৰক উপাদান ব্যৱহাৰ কৰক৷
x\left(x+\left(6-i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
6-i লাভ কৰিবৰ বাবে -1 আৰু -6+i পুৰণ কৰক৷
x\left(x+\left(6-i\right)\right)\left(x+\left(1-3i\right)\right)^{2}+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
1-3i লাভ কৰিবৰ বাবে -1 আৰু -1+3i পুৰণ কৰক৷
x\left(x+\left(6-i\right)\right)\left(x^{2}+\left(2-6i\right)x+\left(-8-6i\right)\right)+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
\left(x+\left(1-3i\right)\right)^{2} বিস্তাৰ কৰিবলৈ দ্বিপদীয় উপপাদ্য \left(a+b\right)^{2}=a^{2}+2ab+b^{2} ব্যৱহাৰ কৰক৷
\left(x^{2}+\left(6-i\right)x\right)\left(x^{2}+\left(2-6i\right)x+\left(-8-6i\right)\right)+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
xক x+\left(6-i\right)ৰে পূৰণ কৰিবলৈ বিতৰক উপাদান ব্যৱহাৰ কৰক৷
x^{4}+\left(2-6i\right)x^{3}+\left(-8-6i\right)x^{2}+\left(6-i\right)x^{3}+\left(6-38i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
x^{2}+\left(6-i\right)xৰ প্ৰতিটো পদক x^{2}+\left(2-6i\right)x+\left(-8-6i\right)ৰ প্ৰতিটো পদেৰে পূৰণ কৰি বিভাজন ধৰ্মটো প্ৰয়োগ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-8-6i\right)x^{2}+\left(6-38i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
\left(8-7i\right)x^{3} লাভ কৰিবলৈ \left(2-6i\right)x^{3} আৰু \left(6-i\right)x^{3} একত্ৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
\left(-2-44i\right)x^{2} লাভ কৰিবলৈ \left(-8-6i\right)x^{2} আৰু \left(6-38i\right)x^{2} একত্ৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x+\left(6-i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
6-i লাভ কৰিবৰ বাবে -1 আৰু -6+i পুৰণ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x+\left(6-i\right)\right)\left(x+\left(1-3i\right)\right)^{2}
1-3i লাভ কৰিবৰ বাবে -1 আৰু -1+3i পুৰণ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x+\left(6-i\right)\right)\left(x^{2}+\left(2-6i\right)x+\left(-8-6i\right)\right)
\left(x+\left(1-3i\right)\right)^{2} বিস্তাৰ কৰিবলৈ দ্বিপদীয় উপপাদ্য \left(a+b\right)^{2}=a^{2}+2ab+b^{2} ব্যৱহাৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(\left(6+i\right)x+37\right)\left(x^{2}+\left(2-6i\right)x+\left(-8-6i\right)\right)
6+iক x+\left(6-i\right)ৰে পূৰণ কৰিবলৈ বিতৰক উপাদান ব্যৱহাৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)x^{3}+\left(18-34i\right)x^{2}+\left(-42-44i\right)x+37x^{2}+\left(74-222i\right)x+\left(-296-222i\right)
\left(6+i\right)x+37ৰ প্ৰতিটো পদক x^{2}+\left(2-6i\right)x+\left(-8-6i\right)ৰ প্ৰতিটো পদেৰে পূৰণ কৰি বিভাজন ধৰ্মটো প্ৰয়োগ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)x^{3}+\left(55-34i\right)x^{2}+\left(-42-44i\right)x+\left(74-222i\right)x+\left(-296-222i\right)
\left(55-34i\right)x^{2} লাভ কৰিবলৈ \left(18-34i\right)x^{2} আৰু 37x^{2} একত্ৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)x^{3}+\left(55-34i\right)x^{2}+\left(32-266i\right)x+\left(-296-222i\right)
\left(32-266i\right)x লাভ কৰিবলৈ \left(-42-44i\right)x আৰু \left(74-222i\right)x একত্ৰ কৰক৷
x^{4}+\left(14-6i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(55-34i\right)x^{2}+\left(32-266i\right)x+\left(-296-222i\right)
\left(14-6i\right)x^{3} লাভ কৰিবলৈ \left(8-7i\right)x^{3} আৰু \left(6+i\right)x^{3} একত্ৰ কৰক৷
x^{4}+\left(14-6i\right)x^{3}+\left(53-78i\right)x^{2}+\left(-54-28i\right)x+\left(32-266i\right)x+\left(-296-222i\right)
\left(53-78i\right)x^{2} লাভ কৰিবলৈ \left(-2-44i\right)x^{2} আৰু \left(55-34i\right)x^{2} একত্ৰ কৰক৷
x^{4}+\left(14-6i\right)x^{3}+\left(53-78i\right)x^{2}+\left(-22-294i\right)x+\left(-296-222i\right)
\left(-22-294i\right)x লাভ কৰিবলৈ \left(-54-28i\right)x আৰু \left(32-266i\right)x একত্ৰ কৰক৷
\left(x-\left(-6-i\right)\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
\left(x-\left(-1+3i\right)\right)^{2} লাভ কৰিবৰ বাবে x-\left(-1+3i\right) আৰু x-\left(-1+3i\right) পুৰণ কৰক৷
\left(x+\left(6+i\right)\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
-6-iৰ বিপৰীত হৈছে 6+i৷
\left(x\left(x-\left(-6+i\right)\right)+\left(6+i\right)\left(x-\left(-6+i\right)\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
x+\left(6+i\right)ক x-\left(-6+i\right)ৰে পূৰণ কৰিবলৈ বিতৰক উপাদান ব্যৱহাৰ কৰক৷
x\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
x\left(x-\left(-6+i\right)\right)+\left(6+i\right)\left(x-\left(-6+i\right)\right)ক \left(x-\left(-1+3i\right)\right)^{2}ৰে পূৰণ কৰিবলৈ বিতৰক উপাদান ব্যৱহাৰ কৰক৷
x\left(x+\left(6-i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
6-i লাভ কৰিবৰ বাবে -1 আৰু -6+i পুৰণ কৰক৷
x\left(x+\left(6-i\right)\right)\left(x+\left(1-3i\right)\right)^{2}+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
1-3i লাভ কৰিবৰ বাবে -1 আৰু -1+3i পুৰণ কৰক৷
x\left(x+\left(6-i\right)\right)\left(x^{2}+\left(2-6i\right)x+\left(-8-6i\right)\right)+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
\left(x+\left(1-3i\right)\right)^{2} বিস্তাৰ কৰিবলৈ দ্বিপদীয় উপপাদ্য \left(a+b\right)^{2}=a^{2}+2ab+b^{2} ব্যৱহাৰ কৰক৷
\left(x^{2}+\left(6-i\right)x\right)\left(x^{2}+\left(2-6i\right)x+\left(-8-6i\right)\right)+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
xক x+\left(6-i\right)ৰে পূৰণ কৰিবলৈ বিতৰক উপাদান ব্যৱহাৰ কৰক৷
x^{4}+\left(2-6i\right)x^{3}+\left(-8-6i\right)x^{2}+\left(6-i\right)x^{3}+\left(6-38i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
x^{2}+\left(6-i\right)xৰ প্ৰতিটো পদক x^{2}+\left(2-6i\right)x+\left(-8-6i\right)ৰ প্ৰতিটো পদেৰে পূৰণ কৰি বিভাজন ধৰ্মটো প্ৰয়োগ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-8-6i\right)x^{2}+\left(6-38i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
\left(8-7i\right)x^{3} লাভ কৰিবলৈ \left(2-6i\right)x^{3} আৰু \left(6-i\right)x^{3} একত্ৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x-\left(-6+i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
\left(-2-44i\right)x^{2} লাভ কৰিবলৈ \left(-8-6i\right)x^{2} আৰু \left(6-38i\right)x^{2} একত্ৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x+\left(6-i\right)\right)\left(x-\left(-1+3i\right)\right)^{2}
6-i লাভ কৰিবৰ বাবে -1 আৰু -6+i পুৰণ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x+\left(6-i\right)\right)\left(x+\left(1-3i\right)\right)^{2}
1-3i লাভ কৰিবৰ বাবে -1 আৰু -1+3i পুৰণ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)\left(x+\left(6-i\right)\right)\left(x^{2}+\left(2-6i\right)x+\left(-8-6i\right)\right)
\left(x+\left(1-3i\right)\right)^{2} বিস্তাৰ কৰিবলৈ দ্বিপদীয় উপপাদ্য \left(a+b\right)^{2}=a^{2}+2ab+b^{2} ব্যৱহাৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(\left(6+i\right)x+37\right)\left(x^{2}+\left(2-6i\right)x+\left(-8-6i\right)\right)
6+iক x+\left(6-i\right)ৰে পূৰণ কৰিবলৈ বিতৰক উপাদান ব্যৱহাৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)x^{3}+\left(18-34i\right)x^{2}+\left(-42-44i\right)x+37x^{2}+\left(74-222i\right)x+\left(-296-222i\right)
\left(6+i\right)x+37ৰ প্ৰতিটো পদক x^{2}+\left(2-6i\right)x+\left(-8-6i\right)ৰ প্ৰতিটো পদেৰে পূৰণ কৰি বিভাজন ধৰ্মটো প্ৰয়োগ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)x^{3}+\left(55-34i\right)x^{2}+\left(-42-44i\right)x+\left(74-222i\right)x+\left(-296-222i\right)
\left(55-34i\right)x^{2} লাভ কৰিবলৈ \left(18-34i\right)x^{2} আৰু 37x^{2} একত্ৰ কৰক৷
x^{4}+\left(8-7i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(6+i\right)x^{3}+\left(55-34i\right)x^{2}+\left(32-266i\right)x+\left(-296-222i\right)
\left(32-266i\right)x লাভ কৰিবলৈ \left(-42-44i\right)x আৰু \left(74-222i\right)x একত্ৰ কৰক৷
x^{4}+\left(14-6i\right)x^{3}+\left(-2-44i\right)x^{2}+\left(-54-28i\right)x+\left(55-34i\right)x^{2}+\left(32-266i\right)x+\left(-296-222i\right)
\left(14-6i\right)x^{3} লাভ কৰিবলৈ \left(8-7i\right)x^{3} আৰু \left(6+i\right)x^{3} একত্ৰ কৰক৷
x^{4}+\left(14-6i\right)x^{3}+\left(53-78i\right)x^{2}+\left(-54-28i\right)x+\left(32-266i\right)x+\left(-296-222i\right)
\left(53-78i\right)x^{2} লাভ কৰিবলৈ \left(-2-44i\right)x^{2} আৰু \left(55-34i\right)x^{2} একত্ৰ কৰক৷
x^{4}+\left(14-6i\right)x^{3}+\left(53-78i\right)x^{2}+\left(-22-294i\right)x+\left(-296-222i\right)
\left(-22-294i\right)x লাভ কৰিবলৈ \left(-54-28i\right)x আৰু \left(32-266i\right)x একত্ৰ কৰক৷
উদাহৰণসমূহ
দ্বিঘাত সমীকৰণ
{ x } ^ { 2 } - 4 x - 5 = 0
ত্ৰিকোণমিতি
4 \sin \theta \cos \theta = 2 \sin \theta
ৰৈখিক সমীকৰণ
y = 3x + 4
অঙ্ক
699 * 533
মেট্ৰিক্স
\left[ \begin{array} { l l } { 2 } & { 3 } \\ { 5 } & { 4 } \end{array} \right] \left[ \begin{array} { l l l } { 2 } & { 0 } & { 3 } \\ { -1 } & { 1 } & { 5 } \end{array} \right]
সমকালীন সমীকৰণ
\left. \begin{cases} { 8x+2y = 46 } \\ { 7x+3y = 47 } \end{cases} \right.
পৃথকীকৰণ
\frac { d } { d x } \frac { ( 3 x ^ { 2 } - 2 ) } { ( x - 5 ) }
ইণ্টিগ্ৰেশ্বন
\int _ { 0 } ^ { 1 } x e ^ { - x ^ { 2 } } d x
সীমা
\lim _{x \rightarrow-3} \frac{x^{2}-9}{x^{2}+2 x-3}