- #1
kaliprasad
Gold Member
MHB
- 1,335
- 0
Prove that if the sides of a triangle are prime numbers its area cannot be whole number.
Can a Triangle with Prime Number Sides Have a Whole Number Area?
In summary, the integer area of a triangle refers to the number of square units that can fit within the space enclosed by the three sides of a triangle, where all three sides are whole numbers. It can be calculated using the formula A = (b * h) / 2, where b is the length of the base of the triangle and h is the height. While a triangle can have a non-integer area, the integer area is always a whole number as long as the length of the base and height are whole numbers. Knowing the integer area of a triangle can have practical applications in fields such as architecture, construction, and engineering, as well as in everyday situations.
- #2
RLBrown
- 60
- 0
kaliprasad said:
View attachment 3168
From both forms, the RHS is odd if no side length is 2.
If only one side is 2, the RHS still does not yield the factor of value 16 required by the LHS.
From both forms, the RHS is odd if no side length is 2.
If only one side is 2, the RHS still does not yield the factor of value 16 required by the LHS.
Attachments
- #3
kaliprasad
Gold Member
MHB
- 1,335
- 0
Let the sides be $a,b, c$ and $a \le b\le c$
now there are 2 cases
$a = 2$ or all are odd
if A is area then $A^2 = \dfrac{( a+b-c)(a+b+c)(a-b+c)(b+c-a)}{4}$if all are odd then all 4 terms on the numerator of RHS are odd then $A^2$ cannot be integer so A cannot be whole number
case 2:
for $a= 2$ and $b = 2$ or $a= 2$ and $b != 2$
$a = 2\, b =2 \, => c = 2\, or\, 3$
$a =2\, b = 2\, c = 2 => A^2 = \dfrac{6*2^3}{4} = 12$ so A is not integer
$a =2\ , b= 2\, c = 3 => A^2 = \dfrac{7 * 1 * 3 * 3}{4}=\dfrac{3^2*7}{2^2}$ so A is not integerif $b\ne 2$ then $b= c$ because if $c \gt b$ then $c\ge b+2$ or $a+b\le c$
so we get $A^2 = \dfrac{(2+2b)* (2b-2)* b^2}{4}= \dfrac{b^2(b^2-1)}{4}$ cannot be a perfect squareso no solution
now there are 2 cases
$a = 2$ or all are odd
if A is area then $A^2 = \dfrac{( a+b-c)(a+b+c)(a-b+c)(b+c-a)}{4}$if all are odd then all 4 terms on the numerator of RHS are odd then $A^2$ cannot be integer so A cannot be whole number
case 2:
for $a= 2$ and $b = 2$ or $a= 2$ and $b != 2$
$a = 2\, b =2 \, => c = 2\, or\, 3$
$a =2\, b = 2\, c = 2 => A^2 = \dfrac{6*2^3}{4} = 12$ so A is not integer
$a =2\ , b= 2\, c = 3 => A^2 = \dfrac{7 * 1 * 3 * 3}{4}=\dfrac{3^2*7}{2^2}$ so A is not integerif $b\ne 2$ then $b= c$ because if $c \gt b$ then $c\ge b+2$ or $a+b\le c$
so we get $A^2 = \dfrac{(2+2b)* (2b-2)* b^2}{4}= \dfrac{b^2(b^2-1)}{4}$ cannot be a perfect squareso no solution
Last edited:
Related to Can a Triangle with Prime Number Sides Have a Whole Number Area?
What is the integer area of a triangle?
The integer area of a triangle refers to the number of square units that can fit within the space enclosed by the three sides of a triangle, where all three sides are whole numbers.
How is the integer area of a triangle calculated?
The integer area of a triangle can be calculated using the formula A = (b * h) / 2, where b is the length of the base of the triangle and h is the height.
Can a triangle have a non-integer area?
Yes, a triangle can have a non-integer area. This occurs when the length of the base and/or height of the triangle are not whole numbers.
Is the integer area of a triangle always a whole number?
Yes, the integer area of a triangle is always a whole number as long as the length of the base and height of the triangle are both whole numbers.
What is the practical application of knowing the integer area of a triangle?
Knowing the integer area of a triangle can be useful in various fields such as architecture, construction, and engineering. It can also be used in everyday situations, such as calculating the area of a room or the amount of material needed for a project.
Similar threads
-
General Math
-
General Math
-
General Math
-
General Math
-
General Math
-
Calculus and Beyond Homework Help
-
General Math