Answer:b
Step-by-step explanation:
The composition of two translations could describe the taxicab’s final position are (1, -2 + 16) and (1, -2 - 16)
<h3>How to determine the composition of two translations?</h3>
The initial position is given as:
Cab = (1, -2)
Assume the cab travel in one direction, the possible translations are:
(x, y + 16)
(x, y - 16)
(x + 16, y)
(x - 16, y)
Using the first two translations, the final positions are:
(1, -2 + 16) = (1, 14)
(1, -2 - 16) = (1, -18)
Hence, the composition of two translations could describe the taxicab’s final position are (1, -2 + 16) and (1, -2 - 16)
Read more about translations at:
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Answer:
x=0 x=-5 x=2
Step-by-step explanation:
4x3 + 12x2 = 40x
Subtract 40x from each side
4x3 + 12x2 - 40x=0
Factor out 4x from each term
4x( x^2 +3x-10) =0
Factor the term insdie the parentheses
What 2 numbers multiply to -10 and add to 3
5*-2 =-10
5+-2 =3
We have (x+5) (x-2)
Replace that in the equation
4x ( x+5) (x-2) =0
Using the zero product property
4x= 0 x+5 =0 x-2 =0
x=0 x=-5 x=2
Answer:
Step-by-step explanation:
