Math, asked by amansadhiq19, 4 months ago

calculate the area of a rectangular field whose lenght is (2x+3) units and breadth (x-6) units​

Answers

Answered by akankshakamble6
1

Answer:

Area of rectangle=length X breath

=(2x+3)×(x-6)

=2x^2+3x-12x-18

=2x^2-9x-18=0

=2x^2-12x+3x-18=0

=2x(x-6)+3(x-6)=0

=(x-6)(2x+3)=0

=(2x+3)=0

=2x=-3=x=3/2

therefore x =3/2

length=6 and breadth=0

Answered by Ritikraj05
0

Answer:

x- 3/2

Step-by-step explanation:

l - (2x+3) and b- (x-6)

(2x+3)(x-6)

2x²-12x+3x-18

2x²-3x+12x-18

x(2x-3) + 6(2x-3)

(x+6) (2x-3)

x - -6 and x- 3/2

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