Suppose one wants a taylor polynomial approximation for f(x) = ln(4 − 2x) around x0 = 0 over the interval [−1, 1]. using the error bounding method from class (alternatively from the textbook as in the previous problem), what is the minimum order taylor polynomial that guarantees the error will never exceed ε = 0.1 anywhere in the interval? what is the corresponding taylor polynomial? what are the actual errors at x = −1, x = 0 and x = 1?

n

step-by-step explanation:

37/3

step-by-step explanation:

step 1: simplify both sides of the equation.

7x+8(x+

1

4

)=3(6x−9)−8

7x+(8)(x)+(8)(

1

4

)=(3)(6x)+(3)(−9)+−8(distribute)

7x+8x+2=18x+−27+−8

(7x+8x)+(2)=(18x)+(−27+−8)(combine like terms)

15x+2=18x+−35

15x+2=18x−35

tep 2: subtract 18x from both sides.

15x+2−18x=18x−35−18x

−3x+2=−35

step 3: subtract 2 from both sides.

−3x+2−2=−35−2

−3x=−37

step 4: divide both sides by -3.

−3x

−3

=

−37

−3

x=

37

3

1/3

step-by-step explanation:

to find this, you can divide 12 by 4 which is 3 or you can multiply 4 until you reach 12 (4x3=12). both should give you 3, meaning theres three times less bananas than there are oranges.

your answer is the frist one

hop i