16:["$","$L1d",null,{"className":"h-[100dvh] min-h-0","children":[["$","script",null,{"type":"application/ld+json","dangerouslySetInnerHTML":{"__html":"{\"@context\":\"https://schema.org\",\"@type\":\"Quiz\",\"name\":\"( boldsymbol A A(-2,4), B(4,-5), F= left[ begin array ccc 1+p-q & 2 p q & -2 q 2 p q & 1-p+q & 2 q 2 q & -2 p & 1-p-q end array right] )\",\"about\":\"রেখা বিভাজন ও অনুপাত \",\"hasPart\":{\"@type\":\"Question\",\"name\":\"( boldsymbol A A(-2,4), B(4,-5), F= left[ begin array ccc 1+p-q & 2 p q & -2 q 2 p q & 1-p+q & 2 q 2 q & -2 p & 1-p-q end array right] )\",\"text\":\"( boldsymbol A A(-2,4), B(4,-5), F= left[ begin array ccc 1+p-q & 2 p q & -2 q 2 p q & 1-p+q & 2 q 2 q & -2 p & 1-p-q end array right] )\",\"suggestedAnswer\":[{\"@type\":\"Answer\",\"text\":\"( r=2 a cos theta ) সমীকরণকে কার্তেসীয় সমীকরণে প্রকাশ কর।\"},{\"@type\":\"Answer\",\"text\":\"AB রেখাংশকে C পর্যন্ত বর্ধিত করা হলো যেন ( AB=3 BC ) হয়। C বিন্দুর স্থানাঙ্ক নির্ণয় কর।\"},{\"@type\":\"Answer\",\"text\":\"( sqrt p =x, sqrt q =y ) হলে, প্রমাণ কর যে, ( |F|=(1+p+q)^ 3 )\"},{\"@type\":\"Answer\",\"text\":\"null\"}]}}"}}],["$","$L1e",null,{}],["$","$L1f",null,{"className":"flex h-[100dvh] flex-col overflow-hidden","children":[["$","header",null,{"className":"sticky top-0 z-10 flex h-14 shrink-0 items-center justify-between border-b bg-background/95 px-4 backdrop-blur-md md:hidden","children":[["$","$L20",null,{"className":"-ml-1"}],["$","$L21",null,{"href":"/ai","className":"flex items-center gap-2","children":[["$","$L22",null,{"src":"/suva_logo.svg","alt":"Suva AI","width":24,"height":24,"className":"h-6 w-6","priority":true}],["$","span",null,{"className":"text-sm font-semibold","children":"Suva AI"}]]}],["$","div",null,{"className":"w-8","aria-hidden":"true"}]]}],["$","main",null,{"className":"flex-1 select-none overflow-y-auto bg-background text-foreground","children":["$","div",null,{"className":"mx-auto grid w-full max-w-6xl gap-4 p-4 sm:p-6 md:grid-cols-[minmax(0,1fr)_300px] lg:p-8","children":[["$","h1",null,{"className":"sr-only","children":"( boldsymbol A A(-2,4), B(4,-5), F= left[ begin array ccc 1+p-q & 2 p q & -2 q 2 p q & 1-p+q & 2 q 2 q & -2 p & 1-p-q end array right] )"}],["$","div",null,{"className":"min-w-0 space-y-4","children":[["$","$L23",null,{"q":{"_id":"bmKmq2_OXuSRjRC6","question":"

\$ \\boldsymbol{A} A(-2,4), B(4,-5), F=\\left[\\begin{array}{ccc}1+p-q & 2 \\sqrt{p q} & -2 \\sqrt{q} \\\\ 2 \\sqrt{p q} & 1-p+q & 2 \\sqrt{q} \\\\ 2 \\sqrt{q} & -2 \\sqrt{p} & 1-p-q\\end{array}\\right] \$

","A":"

\$ r=2 a \\cos \\theta \$ সমীকরণকে কার্তেসীয় সমীকরণে প্রকাশ কর।

","B":"

AB রেখাংশকে C পর্যন্ত বর্ধিত করা হলো যেন \$ \\mathrm{AB}=3 \\mathrm{BC} \$ হয়। C বিন্দুর স্থানাঙ্ক নির্ণয় কর।

","C":"

\$ \\sqrt{\\mathrm{p}}=\\mathrm{x}, \\sqrt{\\mathrm{q}}=\\mathrm{y} \$ হলে, প্রমাণ কর যে, \$ |\\mathrm{F}|=(1+\\mathrm{p}+\\mathrm{q})^{3} \$

","D":"

null

","solution":"","answer":null,"type":"CQ_3","tags":"AMC 24","meta":{"label":"কলেজ","locked":true,"cq_topic":{"A":"_UF8d6af_U","B":"GP12_Oy36-","C":"Jx7FAYPu1W"},"lockedAt":1768742108405,"ai_explanation":{"like":0,"dislike":0,"explanation":"

ম্যাট্রিক্স A এবং B-এর গুণফল AB নির্ণয় করো:

প্রদত্ত ম্যাট্রিক্স:

\$ A=\\begin{bmatrix} 1 & 1 \\\\ -1 & 1 \\end{bmatrix} \\text{ এবং } B=\\begin{bmatrix} 1 & -1 \\\\ -1 & -1 \\end{bmatrix} \$

ম্যাট্রিক্স A এবং B-এর গুণফল AB হবে:

\$ AB = \\begin{bmatrix} 1 & 1 \\\\ -1 & 1 \\end{bmatrix} \\begin{bmatrix} 1 & -1 \\\\ -1 & -1 \\end{bmatrix} \$

গুণ করার পদ্ধতি অনুসারে:

\$ AB = \\begin{bmatrix} (1)(1) + (1)(-1) & (1)(-1) + (1)(-1) \\\\ (-1)(1) + (1)(-1) & (-1)(-1) + (1)(-1) \\end{bmatrix} \$

\$ AB = \\begin{bmatrix} 1 - 1 & -1 - 1 \\\\ -1 - 1 & 1 - 1 \\end{bmatrix} \$

\$ AB = \\begin{bmatrix} 0 & -2 \\\\ -2 & 0 \\end{bmatrix} \$

এখন, এই ম্যাট্রিক্স থেকে 2 কমন নিলে পাই:

\$ AB = 2\\begin{bmatrix} 0 & -1 \\\\ -1 & 0 \\end{bmatrix} \$

সুতরাং, ম্যাট্রিক্স A এবং B-এর গুণফল হলো:

\$ 2\\begin{bmatrix} 0 & -1 \\\\ -1 & 0 \\end{bmatrix} \$

\n"}},"topic":"GP12_Oy36-","createdAt":"2024-11-20T09:23:23.000Z","subject":"math","_source":"Math_1stPaper_Academic_CQ","topicName":"রেখা বিভাজন ও অনুপাত "},"index":0,"showAnswers":true,"disableInteractions":true,"topicId":"GP12_Oy36-","hideReport":true}],"$L24"]}],"$L25"]}]}]]}]]}]