B. The main cause of Type 2 Diabetes
C. Condition that makes it hard for the body to control the level of glucose in the blood.
D. Damage to the pancreas caused by one’s own antibodies
E. The elevation of glucose levels in the blood
F. Found to help with the treatment of clinical depression
G. Organ where insulin is produced
H. “Good” cholesterol
I. 90% to 95% of the cases of diabetes in America
J. Hardening of the arteries caused by a build-up of fatty materials
1. Diabetes (1 point)
2. Atherosclerosis (1 point)
3. Hyperglycemia (1 point)
4. HDL (1 point)
5. Obesity (1 point)
6. Type 1 (1 point)
7. Insulin (1 point)
8. Type 2 (1 point)
9. Pancreas (1 point)
10. Regular aerobic exercise (1 point)
A. Insulin
B. Diabetes
C. Hyperglycemia
D.
E.
F.
G .Pancreas
H. HDL
I. Obesity
J. Atherosclerosis
Answer:
triangle inequality: the sum of the length of two sides of a triangle must always be greater than the length of the third side.
we know 2 sides whose sum = 5+8 = 13cm
the 3rd side must be <13 included
the length of the third side must be less than 13 cm, i.e. between 1 and 13 (it cannot be equal to 0 because in this case it does not exist)
A negative integer is a whole number.
Answer:
A negative integer is a whole number
NEVER TRUE
Integers run from 0 on up
No decimals
No fractions
Step-by-step explanation:
b. –3 and –17
c. 2 and 16
d. 3 and 17
The measure of each exterior angle for a regular hexagon is 60⁰.
A hexagon is a six-sided polygon or 6-gon. The total of the internal angles of any simple hexagon is 720°.
In a regular Hexagon, all sides are same size and measure of all interior angles are same.
The sum of interior angles of hexagon is (n−2)×180⁰
where n is number of sides of polygon. (6−2)×180⁰ = 720⁰.
here n=6 because hexa means 6
Each interior angle =720⁰/6=120⁰
As we know that the sum of interior and exterior angles is 180⁰
Exterior angle + interior angle =180⁰
Exterior angle +120⁰ = 180⁰
Exterior angle =180⁰−120⁰ = 60⁰
Thus, the measure of each exterior angle for a regular hexagon is 60⁰.
Learn more about Hexagon from:
#SPJ2
Solve the following system:
{y = x + 4 | (equation 1)
y + x = 2 | (equation 2)
Express the system in standard form:
{-x + y = 4 | (equation 1)
x + y = 2 | (equation 2)
Add equation 1 to equation 2:
{-x + y = 4 | (equation 1)
0 x + 2 y = 6 | (equation 2)
Divide equation 2 by 2:
{-x + y = 4 | (equation 1)
0 x + y = 3 | (equation 2)
Subtract equation 2 from equation 1:
{-x + 0 y = 1 | (equation 1)
0 x + y = 3 | (equation 2)
Multiply equation 1 by -1:
{x + 0 y = -1 | (equation 1)
0 x + y = 3 | (equation 2)
Answer: x = -1 y = 3