untitled 11th Grade Quiz | Wayground (formerly Quizizz)

untitled

Quiz

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Mathematics

•

11th Grade

•

Hard

rodica batista

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8 questions

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MULTIPLE SELECT QUESTION

2 mins • 1 pt

$\lim_{x\rightarrow2}\left(-3x^2+7x-2\right)=$

-2

-24

MULTIPLE SELECT QUESTION

2 mins • 1 pt

$\lim_{x\rightarrow-1}\left(3x^3-2x+16\right)=$

-13

-1

MULTIPLE SELECT QUESTION

2 mins • 1 pt

$l_1=\lim_{x\rightarrow\infty}\left(-2x^4+3x-4\right)\ si\$

l_2=\lim_{x\rightarrow-\infty}\left(-x^3+x-1\right)

$l_l=+\infty,\ l_2=-\infty$

$l_l=-\infty,\ l_2=+\infty$

$l_l=-\infty,\ l_2=-\infty$

$l_l=+\infty,\ l_2=+\infty$

MULTIPLE SELECT QUESTION

3 mins • 1 pt

$l_1=\lim_{x\rightarrow4}\left(\frac{3}{2}\right)^x,\ \ l_2=\lim_{x\rightarrow\infty}\left(\frac{5}{6}\right)^x$

$l_1=\frac{9}{6},\ \ l_2=0$

$l_1=\frac{12}{8},\ \ l_2=\infty$

$l_1=\frac{9}{6},\ \ l_2=\infty$

$l_1=\frac{81}{16},\ \ l_2=0$

MULTIPLE SELECT QUESTION

5 mins • 1 pt

Studiați dacă funcția are limită în punctul x=2

are limită

nu are limită

doar limita la dreapta

doar limita la stânga

MULTIPLE SELECT QUESTION

5 mins • 1 pt

Să se determine valoarea parametrului real a astfel încât funcția să aibă limită în punctul x=-1 !

a=12

a=-6

a=16

a=-12

MULTIPLE SELECT QUESTION

5 mins • 1 pt

$f:D\rightarrow R,\ f\left(x\right)=\frac{2x-4}{x-5}$ Calculați limita la sânga, și limita la dreapta în punctul x=5

$l_s=\infty\ și\ l_d=-\infty$

$l_s=-\infty\ și\ l_d=\infty$

$l_s=-\infty\ și\ l_d=-\infty$

$l_s=+\infty\ și\ l_d=+\infty$

MULTIPLE SELECT QUESTION

15 mins • 1 pt

$f:D\rightarrow R,\ f\left(x\right)=\frac{-2x+1}{4-x^2}$ Calculați : limita la stânga și limita la dreapta în punctul x=2 respectiv în punctul x=-2 (deci în total patru limite)

$l_s\left(2\right)=\infty\ și\ l_d\left(2\right)=-\infty\$
$l_s\left(-2\right)=-\infty\ și\ l_d\left(-2\right)=+\infty$

$l_s\left(2\right)=-\infty\ și\ l_d\left(2\right)=+\infty\$
$l_s\left(-2\right)=-\infty\ și\ l_d\left(-2\right)=+\infty$

$l_s\left(2\right)=-\infty\ și\ l_d\left(2\right)=+\infty\$
$l_s\left(-2\right)=+\infty\ și\ l_d\left(-2\right)=-\infty$

$l_s\left(2\right)=+\infty\ și\ l_d\left(2\right)=-\infty\$
$l_s\left(-2\right)=+\infty\ și\ l_d\left(-2\right)=-\infty$

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