A condition statement uses à as its notation ?
Answers
If x then Y, it denoted as : x -> y
~x will denotes negation of x
So inverse of above statement would be ~x -> ~y and contrapositive is ~y -> ~x
hope this helps
Related Questions
Find the measure of angle X in the figure below Choices: 35°, 47°, 73°, 78°
A person earns $25,100 one year and gets a 5% raise in salary. what is the new salary?
3p4 ( 4p4 + 7p3 + 1 )
do you think making a table is the best way to find the total area of the rooms given in the example is there another problem solving strategy you think would work just as well or better describe the alternate method and why you think it works
Answers
Answer:
(-5, -2)
Step-by-step explanation:
Rule for reflection over y = x :
(x, y) -> (y, x)
Answer:
2, -5
Step-by-step explanation:
Answers
Answer:
C.369
Step-by-step explanation:
one year is 12 months and he took out 30.75 every month so
30.75 multiplied by 12 is 369
its C
Answers
but ok the math way
xy=1.5
x+y=3.5
y=3.5-x
x(3.5-x)=1.5
3.5x-x^2=1.5
0=x^2-3.5x+1.5
quadratic
ax^2+bx+c=0
x=
a=1
b=-3.5
c=1.5
x=
x=
x=
x=
x=
x=6/2 or 1/2
x=3 or 0.5
those are the numbers
3 and 0.5
Then, we suggest this system of equations:
xy=1.5
x+y=3.5
we can solve this system of equations by substitution method.
y=3.5 - x
x(3.5-x)=1.5
3.5x-x²=1.5
x²-3.5x+1.5=0
We solve this square equation:
x=[3.5⁺₋√(12.25 - 6)] / 2=(3.5⁺₋2.5)/2
we have two solutions:
x₁=(3.5-2.5) / 2=0.5 then: y₁=3.5-x=3.5 - 0.5=3
x₂=(3.5+2.5)/2=3 then y₂=3.5-x=3.5-3=0.5
Therefore the two numbers are 3 and 0.5
Answer: the numbers are 3 and 0.5
Answers
Answer:
Step-by-step explanation:
Our term is 15+20x
we can divide it to : 15 and 20x
- 15 : it can be divided by 1 , 3 , 5 , 15
so the factors are : (1,3,5,15)
- 20x : to make it easy start with 20
20 can be divided by : 1 , 2 , 4 ,5 ,10 , 20
- then add x :
so the factors of 20 x are :
1 , 2 , 4 , 10 , 20 , x , 2x , 4x , 5x , 10 x , 20x
Answer:
15: 1, 3, 5, 15
20x: 1, 2, 4, 5, 10, 20, x ^_^
Step-by-step explanation:
Answers
Answer:
a = 25m^2
b = 5m
d = 35.73 m^2
c = 7.94m
Step-by-step explanation:
First, remember that the area of a square of side length L is:
A = L^2
And for a triangle rectangle with catheti a and b, and hypotenuse H, we have the relation:
H^2 = a^2 + b^2 (Phytagorean's theorem)
Ok, let's look at the left image, we have a green triangle rectangle.
The bottom cathetus has a length equal to the side length of a square with area of 16m^2
Then the side length of that square (and the cathetus) is:
L^2 = 16m^2
L = √(16m^2) = 4m
The left cathetus has a length equal to the side length of a square of area = 9m^2
Then the side length of that cathetus is:
K^2 = 9m^2
K = √(9m^) = 3m
Then the catheti of the green triangle rectangle are:
4m and 3m
Then the hypotenuse of this triangle (b) is:
b^2 = (4m)^2 + (3m)^2
b^2 = 16m^2 + 9m^2 = 25m^2
b = √(25m^2) = 5m
And b is the side length of the red square, then the area of that square is:
a = b^2 = 25m^2
Now let's go to the other image.
Here we have an hypotenuse of side length H, such that:
H^2 = 144m^2
And we have a cathetus (the one adjacent to the green triangle) of side length L such that:
L^2 = 81m^2
The other cathetus will have a sidelength c, such that:
c^2 = area of the purple square
By the Pythagorean's theorem we have:
144m^2 = 81m^2 + c^2
144m^2 = 81m^2 + c^2
144m^2 - 81m^2 = c^2
63m^2 = c^2
(√63m^2) = c = 7.94m
And the area of a triangle rectangle is equal to the product between the catheti divided by two.
We know that one cathetus is equal to c = 7.94m
And the other on is equal to the square root of 81m^2
√(81m^2) = 9m
then the area of the triangle is:
d = (7.94m)*(9m)/2 = 35.73 m^2
B. The cost of a bunch of grapes compared with its weight
C. The height of a bird over time
D. The number of tickets sold compared with the number of minutes before a football game