2f:["$","section",null,{"className":"py-12 mobile:py-8","children":["$","div",null,{"className":"container max-w-screen-md flex flex-col gap-8","children":[["$","article",null,{"className":"card p-8 mobile:p-6 flex flex-col gap-5","children":[["$","div",null,{"className":"flex items-center justify-between gap-4","children":[["$","span",null,{"className":"eyebrow","children":"MCQ"}],["$","$L30",null,{"url":"https://vidyadip.com/ask/question/jo-x-ysqrt-1-y2-to-dy-over-dx_3420428","title":"જો x = y 1 - y^2 , તો dy dx = — ગણિત ધોરણ 12 સાયન્સ"}]]}],["$","div",null,{"className":"text-xl mobile:text-lg font-medium text-theme-black dark:text-white leading-relaxed [&_img]:max-w-full [&_img]:h-auto [&_table]:w-auto question-html","children":["$","$L31",null,{"html":"જો $x = y\\sqrt {1 - {y^2},} $ તો ${{dy} \\over {dx}} = $"}]}],["$","ul",null,{"className":"flex flex-col gap-3 pt-1","children":[["$","li","A",{"className":"flex items-start gap-3 rounded-xl border px-4 py-3 transition-colors border-[var(--border)] bg-[var(--surface-card)]","children":[["$","span",null,{"className":"shrink-0 w-7 h-7 rounded-full flex items-center justify-center text-sm font-bold bg-[var(--surface-soft)] text-theme-gray","children":"A"}],["$","div",null,{"className":"flex-1 text-theme-black dark:text-white [&_img]:max-w-full [&_img]:h-auto question-html","children":["$","$L31",null,{"html":"$$0$"}]}]]}],["$","li","B",{"className":"flex items-start gap-3 rounded-xl border px-4 py-3 transition-colors border-[var(--border)] bg-[var(--surface-card)]","children":[["$","span",null,{"className":"shrink-0 w-7 h-7 rounded-full flex items-center justify-center text-sm font-bold bg-[var(--surface-soft)] text-theme-gray","children":"B"}],["$","div",null,{"className":"flex-1 text-theme-black dark:text-white [&_img]:max-w-full [&_img]:h-auto question-html","children":["$","$L31",null,{"html":"$$x$"}]}]]}],["$","li","C",{"className":"flex items-start gap-3 rounded-xl border px-4 py-3 transition-colors border-[#0DA659] bg-[#0DA659]/10","children":[["$","span",null,{"className":"shrink-0 w-7 h-7 rounded-full flex items-center justify-center text-sm font-bold bg-[#0DA659] text-white","children":"✓"}],["$","div",null,{"className":"flex-1 text-theme-black dark:text-white [&_img]:max-w-full [&_img]:h-auto question-html","children":["$","$L31",null,{"html":"$${{\\sqrt {1 - {y^2}} } \\over {1 - 2{y^2}}}$"}]}]]}],["$","li","D",{"className":"flex items-start gap-3 rounded-xl border px-4 py-3 transition-colors border-[var(--border)] bg-[var(--surface-card)]","children":[["$","span",null,{"className":"shrink-0 w-7 h-7 rounded-full flex items-center justify-center text-sm font-bold bg-[var(--surface-soft)] text-theme-gray","children":"D"}],["$","div",null,{"className":"flex-1 text-theme-black dark:text-white [&_img]:max-w-full [&_img]:h-auto question-html","children":["$","$L31",null,{"html":"$${{\\sqrt {1 - {y^2}} } \\over {1 + 2{y^2}}}$"}]}]]}]]}]]}],["$","div",null,{"className":"card p-8 mobile:p-6 flex flex-col gap-4","children":[["$","div",null,{"className":"flex items-center gap-2","children":[["$","span",null,{"className":"inline-flex items-center justify-center w-7 h-7 rounded-full bg-[#0DA659]/15 text-[#0DA659] font-bold","children":"✓"}],["$","h2",null,{"className":"text-lg font-bold text-theme-black dark:text-white","children":"Answer"}]]}],["$","div",null,{"className":"text-theme-black dark:text-white flex flex-wrap items-center gap-1.5 question-html","children":[["$","span",null,{"className":"font-semibold","children":["Correct option: ","C","."]}],["$","div",null,{"className":"[&_img]:inline [&_img]:max-w-full [&>div]:inline","children":["$","$L31",null,{"html":"$${{\\sqrt {1 - {y^2}} } \\over {1 - 2{y^2}}}$"}]}]]}],["$","div",null,{"className":"text-theme-gray leading-relaxed [&_img]:max-w-full [&_img]:h-auto question-html","children":["$","$L31",null,{"html":"c
(c) $x = y\\sqrt {1 - {y^2}} $

\n\n

Differentiate with respect to $x,$

\n\n

$1 = \\frac{{dy}}{{dx}}\\sqrt {1 - {y^2}} + y.\\frac{1}{{2\\sqrt {1 - {y^2}} }}\\,.\\,( - 2y)\\,.\\,\\frac{{dy}}{{dx}}$

\n\n

==> $1 = \\frac{{dy}}{{dx}}\\sqrt {1 - {y^2}} - \\frac{{{y^2}}}{{\\sqrt {1 - {y^2}} }}\\,.\\,\\frac{{dy}}{{dx}}$

\n\n

==> $1 = \\frac{{dy}}{{dx}}\\left[ {\\frac{{1 - {y^2} - {y^2}}}{{\\sqrt {1 - {y^2}} }}} \\right]$

\n\n

==> $1 = \\frac{{dy}}{{dx}}\\left[ {\\frac{{1 - 2{y^2}}}{{\\sqrt {1 - {y^2}} }}} \\right]$

\n\n

$\\frac{{dy}}{{dx}} = \\frac{{\\sqrt {1 - {y^2}} }}{{1 - 2{y^2}}}$."}]}]]}],"$L32","$L33","$L34"]}]}]

5. continuity and differentiation — ગણિત ધોરણ 12 સાયન્સ — Question

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