Answer:
No such triangle can exist. Any of the described relations may be in error.
Step-by-step explanation:
Taken at face value, the sum of the lengths of the sides is ...
x + x + (3x-10) = 5
5x = 15
x = 3
so the third side is 3·3 -10 = -1 in length. No such triangle can exist.
If one side is actually 3x-10, the perimeter must be greater than 6 2/3 and less than 40.
If the perimeter is actually 5, then the third side must be 3x-7.5 or an expression with an even smaller constant.
So, the mistake could be in copying any of the numbers, or in copying the multiplier in the description of the 3rd side. There is insufficient information to tell exactly what the mistake is.
Answer:
The perimeter will be 30
Step-by-step explanation:
Perimeter = all side lengths added
Step 1. Determine the length of the triangle
Answer: 5
Step 2. Determine the width of the triangle
Answer: 12
Step 3. Determine the diagonal line across the triangle
Answer + explanation:
For it to figure it out, we must use this method called Pythagorean Theorem
Pythagorean Theorem: a^2 + b^2 = c^2
Where a = 12 b = 5 and c = the diagonal line
12^2 + 5^2 = c^2
144 + 25 = c^2
c^2 = 169
c = 13
The diagonal line measures 13 units
Step 4. Add all of the dimensions we just reviewed
Answer:
Length = 5
Width = 12
Diagonal line = 13
5 + 12 + 13 = perimeter
perimeter = 30
Therefore, the perimeter is 30
Answer:
2500
Step-by-step explanation:
So it seems like we have to find the volume in this problem
The equation of volume it
lwh
Length · Width · Height
So all we do now is simply multiply.
50x25x2= 2500.
(Hope you find this helpful)
Step-by-step explanation:
3/4÷5/16
3/4×16/5
=12/5(2 2/5)
Answer:
Domain and Range of g(f(x)) are 'All real numbers' and {y | y>6 } respectively
Step-by-step explanation:
We have the functions, f(x) = eˣ and g(x) = x+6
So, their composition will be g(f(x)).
Then, g(f(x)) = g(eˣ) = eˣ+6
Thus, g(f(x)) = eˣ+6.
Since the domain and range of f(x) = eˣ are all real numbers and positive real numbers respectively.
Moreover, the function g(f(x)) = eˣ+6 is the function f(x) translated up by 6 units.
Hence, the domain and range of g(f(x)) are 'All real numbers' and {y | y>6 } respectively.
