The height of the triangle is 19.596 centimeter, if a right isosceles triangle has an area of 192 square centimeters.
Step-by-step explanation:
The given is,
Area of right isosceles triangle is 192 square centimeters
Step:1
Formula for area of right isosceles triangle is,
............................(1)
Where, a - Sides of triangle
a = h = b
Here, h - Height of triangle
b - Base of triangle
From given,
Area, A = 192 square centimeters
Equation (1) becomes.
= 384
Take square root on both sides,
a = 19.596 centimeters
Height of right isosceles of triangle, a = h = 19.596 centimeters
Result:
The height of the triangle is 19.596 centimeter, if a right isosceles triangle has an area of 192 square centimeters.
Answer:
D, 2(b-1)/ab
Step-by-step explanation:
subtract 2+b/ab from 3/a
it means 3/a - 2+b/ab
lcm is ab
(3b-(2+b))/ab
(3b-2-b)/ab
(3b-b-2)/ab
(2b-2)/ab
2(b-1)/ab
If your just looking for x then x=2
<span>11/100 + 16/10 equals 1.71, or as a fraction, 1 71/100.</span>
Answer:
3/16, 1/4, 3/8, 1/2
Step-by-step explanation:
For easy comparison, we can re-write all these fractions so the denominators are the same. By observation, we can see that the denominators 2,4 and 8 are all factors of the denominator 16, hence we can express all the fractions such that the denominators equal 16.
1/2 = 8/16
1/4 = 4/16
3/8 = 6/16
3/16 = (needs no re-writing)
Comparing the above, we can see that from smallest to largest:
3/16 , 4/16, 6/16, 8/16
or
3/16, 1/4, 3/8, 1/2