Math, asked by andrewxlorezo, 1 day ago

The length of the new rectangular
baseball field will be 30 meters longer than
it is width and its area must be greater than
the old one. Suppose the area of the old
rectangular baseball field was 4,000 m2

a. What could be the new width of the rectangular baseball field?
b. What could be the new length of the rectangular baseball field?
c. What could be the possible dimensions of the new rectangular baseball
field?
d. What could be the possible areas of the new rectangular baseball field
that they will be considering to construct in the near future?

PLSSS ANSWER ASAP!!!

Answers

Answered by IIGoLDGrAcEII
3

Answer:

\huge \mathcal\green{ ANSWER}

Width = x

Length = x+7

Area = length x width=30

So x(x+7)=30

x^2 +7x -30 = 0

Factor this quadratic

(X-3)(x+10)=0

Using zero product rule

If ab=0 the a=0 or b=0

So x-3=0 OR x+10=0

x=3 or x = -10

Length cannot be a negative value so x =3. The width is therefore 3.

Answered by xXNIHASRAJGONEXx
0

Answer:

Width = x

Length = x+7

Area = length x width=30

So x(x+7)=30

x^2 +7x -30 = 0

Factor this quadratic

(X-3)(x+10)=0

Using zero product rule

If ab=0 the a=0 or b=0

So x-3=0 OR x+10=0

x=3 or x = -10

Length cannot be a negative value so x =3. The width is therefore 3.

please drop some ❤️❤️❤️

Step-by-step explanation:

please f-o-l-l-o-w m-e bro please

Similar questions