HELPP!! Drag the tiles to the boxes to form correct pairs. Not all tiles will be used. Match the resulting values to the corresponding limits.

Question

asked Apr 12, 2020 7.1k views

1 Answer

Robert Kniazidis · Answer 1 · 2020-04-17T21:25:29+0000

Answer:
$\lim_(x \to \infty) (4x-1)/(9+12x)\to (1)/(3)$

$\lim_(x \to 4) (x^2-x-12)/(5x-20)\to(7)/(5)$

$\lim_(x \to -\infty) (5x+6)/(4x+2)\to(5)/(4)$

$\lim_(x \to 3) (4x-12)/(x^2-9)\to(2)/(3)$

Explanation:

i)
$\lim_(x \to \infty) (4x-1)/(9+12x)$

Taking x as common outside from numerator and denominator , we have

$\lim_(x \to \infty) (x(4-(1)/(x)))/(x((9)/(x)+12))\\\\=\lim_(x \to \infty) (4-(1)/(x))/((9)/(x)+12)\\\\=(4-0)/(0+12)=(4)/(12)=(1)/(3)$

ii)
$\lim_(x \to 4) (x^2-x-12)/(5x-20)$

It can be written as :
$\lim_(x \to 4) ((x-4)(x+3))/(5(x-4))$

$=\lim_(x \to 4) (x+3)/(5)=(4+3)/(5)=(7)/(5)$

iii)
$\lim_(x \to -\infty) (5x+6)/(4x+2)$

Taking x as common outside from numerator and denominator , we have

$\lim_(x \to -\infty) (x(5+(6)/(x)))/(x(4+(2)/(x)))\\\\=(5+0)/(4+0)=(5)/(4)$

iv)
$\lim_(x \to 3) (4x-12)/(x^2-9)$

which can be written as :

$\lim_(x \to 3) (4(x-3))/((x-3)(x+3))$ ∵

$=\lim_(x \to 3) (4)/((x+3))=(4)/(3+3)=(4)/(6)=(2)/(3)$