If the lengths of three sides of a triangle are all integers and its perimeter is even, and the lengths of two sides are known to be 4 and 2003 respectively, then the triangle satisfying the above conditions will be a triangle How many are there?

If the lengths of three sides of a triangle are all integers and its perimeter is even, and the lengths of two sides are known to be 4 and 2003 respectively, then the triangle satisfying the above conditions will be a triangle How many are there?

3
4、2003、2001
4、2003、2003
4、2003、2005

The three sides of the unequal sides are integers, where the lengths of the two sides are the circumference of the triangle satisfying the condition of 4 and 7
(1) Three sides of a triangle with unequal sides are integers, where the lengths of the two sides are 4 and 7
(1) How many triangles satisfy the condition?
(2) Find the perimeter of all triangles satisfying the condition

The sum of the two sides of the triangle is greater than the third side. The difference between the two sides is less than the third side
Then the value range of the third side is greater than 3 and less than 11
Then. 7 triangles satisfy the condition
The girth is 15 16 17 18 19 20 21

Given that the circumference of a triangle is 17 and the length of its sides is an integer, how many triangles satisfy the condition

17=8+8+1=8+7+2=8+6+3=8+5+4=7+7+3=7+6+4=7+5+5=6+6+5
There are eight triangles satisfying the condition