// Numbas version: exam_results_page_options {"name": "Funksjoner av flere variabler", "metadata": {"description": "", "licence": "All rights reserved"}, "duration": 0, "percentPass": 0, "showQuestionGroupNames": false, "showstudentname": true, "question_groups": [{"name": "Group", "pickingStrategy": "all-ordered", "pickQuestions": 1, "questionNames": ["", "", "", "", "", "", "", "", "", "", "", "", "", "", "", "", "", "", "", "", ""], "questions": [{"name": "Avstand mellom to funksjoner", "extensions": [], "custom_part_types": [], "resources": [], "navigation": {"allowregen": true, "showfrontpage": false, "preventleave": false, "typeendtoleave": false}, "contributors": [{"name": "Ida Friestad Pedersen", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/792/"}, {"name": "Elena Malyutina", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/7213/"}], "tags": [], "metadata": {"description": "", "licence": "None specified"}, "statement": "

La $f,g:A\\subseteq\\mathbb{R}\\rightarrow\\mathbb{R}$ hvor $A=(-\\var{a},\\var{a})$ og $f(x)=x^3+x^2$ og $g(x)=x^3$.

Da blir avstanden mellom $f$ og $g$ over $(-3,3)$

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La $f:X\\subset\\mathbb{R}^2\\rightarrow \\mathbb{R}$ være en funksjon.

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Eksistensen av de partiellderiverte $f_x(a,b)$ og $f_y(a,b)$ er ikke tilstrekkelig til å garantere at grafen har et tangentplan i $(a, b, f(a,b))$

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Anta $f(x,y)$, $f_x(x,y)$ og $f_y(x,y)$ alle eksisterer i punktet $(a,b)$.

Påstand:

I punktet $(a,b)$ har da $f$ et tangentplan gitt ved

$z=f(a,b)+f_x(a,b)(x-a)+f_y(a,b)(y-b)$

Er denne påstanden sann eller usann?

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Gitt en funksjon $f(x,y)=x^2-\\cos y$

Differensialet til $f$ blir

$df=$ [[0]]$dx$ + [[1]]$dy$

La funksjonen $f:X\\subseteq\\mathbb{R}^n\\rightarrow \\mathbb{R}$ være deriverbar i punktet $\\mathbf{a}$

Velg hvilke påstander som er riktige

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Hvilket av de skraverte grå områdene viser den største definisjonsmengden funksjonen $f(x,y)=\\ln(x+y)$ kan ha?

", "

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Velg et funksjonsuttrykk for hver graf

", "

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La $f(x,y,z)=x^\\var{a}y+y^\\var{b}z+x\\cdot\\sin(z)$

Finn $\\nabla f= \\Big($ [[0]], [[1]], [[2]] $\\Big)$

La $f:\\mathbb{R}^3\\rightarrow \\mathbb{R}$ være en funksjon med retningsderivert $D_v f(a)=\\nabla f(a)\\cdot v$

Velg de påstandene du mener er riktige

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Finn grenseverdien

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$\\lim\\limits_{(x,y)\\rightarrow(\\var{a},\\var{b})} x^2-3xy^2+xy-y$

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Gitt en funksjon $f(x,y)=x^{\\var{a}}e^{y}- y^{\\var{c}}\\ln x$

Vær obs på skrivemåten: f.eks, hvis du trenger å skrive inn $3x^2 e^y-\\ln x$ skriver du: 3x^2*e^y-ln(x) (IKKE 3x^2e^y-lnx). I NUMBAS er det tryggest å skrive alle multiplikasjonstegnene.

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Finn de partiellderiverte og høyre ordens partiellderiverte

$\\frac{\\partial f}{\\partial x}$ = [[0]]

$\\frac{\\partial f}{\\partial y}$ = [[1]]

$\\frac{\\partial^2 f}{\\partial x^2}$ = [[2]]

$\\frac{\\partial^2 f}{\\partial y^2}$ = [[3]]

$\\frac{\\partial^2 f}{\\partial x \\partial y}$ =[[4]]

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La funksjon $f:X\\subset\\mathbb{R}^3\\rightarrow \\mathbb{R}^2$ slik at $f(x,y,z)=(x^{\\var{a}}+y^{\\var{b}}z^{\\var{c}}, \\var{d}\\sin x+ y+z)$

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Finn Jakobimatrisa $D_f(a)$ hvor $a=(0,\\var{f},\\var{g})$

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Gitt en funksjon $f(x,y)=x^{\\var{a}}-y^{\\var{b}}$ og $\\textbf{x}(t)=(\\var{c}t+1,\\var{d}t-2)$.

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Finn et uttrykk for den sammensatte funksjonen $(f\\circ\\textbf{x})(t)=$ [[0]]

Finn den deriverte $\\dfrac{df}{dt}=$ [[1]]

Ta utgangspunkt i kjerneregelen

$\\dfrac{df}{dt}=\\dfrac{\\partial f}{\\partial x}(\\textbf{x})\\cdot\\dfrac{dx}{dt}+\\dfrac{\\partial f}{\\partial y}(\\textbf{x})\\cdot\\dfrac{dy}{dt}$

og finn $\\dfrac{df}{dt}$ på ny. Fyll inn i de åpne feltene

$\\dfrac{df}{dt}=$ [[0]]$\\cdot$ [[1]] $+$ [[2]] $\\cdot$ [[3]]

Det er gitt en funksjon $f:\\{(0,0)\\}\\cup\\{(x,y)|x\\geq5, y\\geq5\\}\\rightarrow\\mathbb{R}$

$f(x,y)=\\Bigg\\{ \\begin{matrix} \\dfrac{x^2+xy^2-y}{x^2+y^2} & hvis\\ (x,y)\\neq(0,0) \\\\ 0 & hvis\\ (x,y)=(0,0) \\end{matrix}$

", "advice": "

Punktet $(0,0)$ er et isolert punkt av $\\{(0,0)\\}\\cup\\{(x,y)|x\\geq5, y\\geq5\\}$

Velg en riktig påstand

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La $f:\\mathbb{R}^3\\rightarrow \\mathbb{R}^2$

Velg hvilke funksjoner som er kontinuerlige

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La $f:\\mathbb{R}^n\\rightarrow\\mathbb{R}^m$ og $g:\\mathbb{R}^m\\rightarrow\\mathbb{R}^p$ være kontinuerlige.

Velg en riktig påstand

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La $f(x,y)=-x^2+xy-y^2-9y+6x$

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$f_x=$ [[0]] =0

$\\Rightarrow$ $\\mathbf{a}=$ ([[2]],[[3]]) er et kritisk punkt

$f_y=$ [[1]] =0

$f_{xx}=$ [[4]]

$f_{xy}=$ [[5]]

$f_{yy}=$ [[6]]

$A=f_{xx}(\\mathbf{a})$ = [[4]], $B=f_{xy}(\\mathbf{a})$ = [[5]], $C=f_{yy}(\\mathbf{a})$ = [[6]], $AC-B^2$= [[7]]

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"suggestGoingBack": false, "adaptiveMarkingPenalty": 0, "exploreObjective": null, "prompt": "

Da $\\mathbf{a}$ er

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La funksjonen $f:X\\subseteq\\mathbb{R}^2\\rightarrow\\mathbb{R}$ være deriverbar i $\\mathbf{a}$.

La $f_x(\\mathbf{a})=f_y(\\mathbf{a})=0$ og $A=f_{xx}(\\mathbf{a})$, $B=f_{xy}(\\mathbf{a})$, $C=f_{yy}(\\mathbf{a})$.

Velg matchende påstander

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$A>0$
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La funksjonen $f:X\\subseteq\\mathbb{R}^3\\rightarrow\\mathbb{R}$ være deriverbar i $\\mathbf{a}$.

La $f_x(\\mathbf{a})=f_y(\\mathbf{a})=f_z(\\mathbf{a})=0$.

La $d_1=f_{xx}(\\mathbf{a})$, $d_2=\\left| \\begin{array}{ccc} f_{xx}(\\mathbf{a}) & f_{xy}(\\mathbf{a}) \\\\ f_{yx}(\\mathbf{a}) & f_{yy}(\\mathbf{a}) \\end{array} \\right|$, $d_3=\\left| \\begin{array}{ccc} f_{xx}(\\mathbf{a}) & f_{xy}(\\mathbf{a}) & f_{xx}(\\mathbf{a}) \\\\ f_{yx}(\\mathbf{a}) & f_{yy}(\\mathbf{a}) & f_{yz}(\\mathbf{a}) \\\\ f_{zx}(\\mathbf{a}) & f_{zy}(\\mathbf{a}) & f_{zz}(\\mathbf{a})\\end{array} \\right|$,

Velg matchende påstander

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Gitt en funksjon $f(x,y)=x^{\\var{a}}\\cos^{\\var{b}}y- y^{\\var{c}}\\sin^{\\var{d}}x^{\\var{f}}$

NB: I denne oppgaven må du være obs på syntax. Hvis du f.eks. trenger å skrive inn $3x^2\\sin^2 x^5$ skriver du: 3x^2*(sin(x^5))^2 (IKKE 3x^2*(sin^2(x^5)))

Finn de partiellderiverte

$\\frac{\\partial f}{\\partial x}$ = [[0]]

$\\frac{\\partial f}{\\partial y}$ = [[1]]

Hvilke av følgende funksjoner er skalarverdifunksjoner

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La $z$ være en funksjon $z(x,y)=\\var{a} x^2+\\var{b}x^{\\var{c}}y+y^{\\var{d}}$ og punkt $P=(\\var{f},\\var{g},z(\\var{f},\\var{g}))$

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Likningen til $z(x,y)$ i punktet $P$ blir

$z=$ [[0]] + [[1]] $(x-(\\var{f}))$+ [[2]] $(y-\\var{g})$