The correct answer is option D
Option D: A parallelogram with 4 right angles and opposite sides are equal best defines a rectangle because a rectangle must possess four right angles and opposite sides must be equal.
What is the value of x?
Enter your answer in the box.
x =
Keep in mind both of these angles are equal to each other meaning the equation will have a = So...
4x+7=5(x-4)
Now multiply 5 to x and 4
4x+7=5x-20
Now subtract 4x from 5x
7=1x-20
Now add 20 to both sides
27=x
So x=27
The equation y-2 is equal to -3 parentheses X minus one is written in point slope or slope intercept form
Answer: Point-Slope
Step-by-step explanation:
Point-Slope: y - y₁ = m(x - x₁) ; where m is the slope and (x₁ , y₁) is the point
Slope-Intercept: y = mx + b ; where m is the slope and b is the y-intercept
************************************************************************************************
y - 2 = -3(x - 1) is in Point-Slope form where -3 is the slope and (1, 2) is the point
Myra is evaluating the expression –31.7 + 4.5x, when x = 2.1.
–31.7 + 4.5(2.1)
–27.2(2.1)
–57.12
What was Myra’s error?
Myra should have multiplied -31.7 and 2.1 first.
Myra should have multiplied 4.5 and 2.1 first.
Myra should have subtracted -27.2 and 2.1 first.
Myra should have added -31.7 and 2.1 first.
–31.7 + 4.5x, when x = 2.1.
-31.7 + 4.5(2.1)
-31.7 + 9.45
Myra should have multiplied 4.5 and 2.1 first.
Answer:
B.Myra should have multiplied 4.5 and 2.1 first.
Step-by-step explanation:
We are given that Myra is evaluating the expression
-31.7+4.5 x when x=21.
We have to find the error in Myra's calculation
When x=2.1
-31.7+4.5(2.1)
-31.7+9.45
=-22.25
By using DMAS rule
D=Divide
M=Multiply
A=Addition
S=Subtraction
But Myra first add -3.7 to 4.5 then multiply
Hence, Myra should have multiplied 4.5 and 2.1 first instead of add.
Answer:B.Myra should have multiplied 4.5 and 2.1 first.
if f(x)=-4x^2-6x-1 and g(x)=-x^2-5x+3 find (f – g)(x)
[tex]f(x)=-4x^2-6x-1\\\\g(x)=-x^2-5x+3\\\\(f-g)(x)=f(x)-g(x)=(-4x^2-6x-1)-(-x^2-5x+3)\\\\=-4x^2-6x-1+x^2+5x-3=(-4x^2+x^2)+(-6x+5x)+(-1-3)\\\\=-3x^2-x-4\to\boxed{B.}[/tex]
What unit of measure would be appropriate for the area of a soccer field that is 105 meters long and 67 meters wide
Answer:
square meters.
Step-by-step explanation:
Area = lengthxwidth for any rectangle.
If length and width are in meters area will be in square meters.
Here length = 105 m and width = 67 m
Area = 105x67 =7035sqm
Answer:
square meters
Step-by-step explanation:
(k+1)(5k+1) I need to find the product
the answer is 5k^2+6k+1
Nola hiked down a trail at a steady rate for 10 minutes. Her change in elevation was −170 feet. Then she continued to hike down for another 20 minutes at a different rate. Her change in elevation for this part of the hike was −220 feet. During which portion of the hike was her rate of change in elevation greater? Complete the explanation
Answer: First portion is greater than second portion.
Step-by-step explanation:
Time taken to hiked down a trail = 10 minutes
Change in elevation = (-) 170 feet
Speed is given by
[tex]Speed=\frac{Distance}{Time}\\\\Speed=\frac{170}{10}\\\\Speed=17\text{ feet per minute}[/tex]
Similarly,
Time taken to hiked down a trail = 20 minutes
Change in elevation = (-)220 feet
Speed is given by
[tex]Speed=\frac{Distance}{Time}[/tex]
[tex]Speed=\frac{220}{20}\\\\Speed=11\text{ feet per minutes}[/tex]
So, we can see that first portion of the hike where he hiked down a trail at a steady rate for 10 minutes and her change in elevation was (-) 170 feet, was her rate of change in elevation greater.
As 17 feet per minutes is greater than 11 feet per minutes.
What is the inverse of the following conditional statement?
"If an angle measures ninety degrees then it is a right angle."
A. If an angle measures ninety degrees then it is a right angle.
B. If an angle does not measure ninety degrees then it is a right angle.
C. If an angle measures ninety degrees then it is not a right angle.
D. If an angle does not measure ninety degrees then it is not a right angle.
Answer: D. If an angle does not measure ninety degrees then it is not a right angle.
Step-by-step explanation:
Hi, to obtain the inverse of a conditional statement we have to negate the hypothesis and the conclusion of the conditional statement.
In this case, the hypothesis is "If an angle measures ninety degrees"
The negative form is "If an angle does not measure ninety degrees" .
The conclusion of the statement is, "then it is a right angle."
The negative form is "then it is not a right angle."
In conclusion, the correct option is option D. If an angle does not measure ninety degrees then it is not a right angle.
Feel free to ask for more if it´s necessary or if you did not understand something.
Erin has $45,688 in sales. If her commission rate Is 2.9% , what is the amount of her commission?
Answer:
The amount of her commission is $1,324.952
Step-by-step explanation:
1. You have the following information given in the problem above:
- Erin has $45,688 in sales.
- Erin's commission rate is 2.9% (0.029).
2. Therefore, to solve this exercise you must multiply the commission rate by her sales, as following:
[tex](45,688)(0.029)=1,324.952[/tex] dollars
Is the following equation true, false, or open?
8x + 7 = 16
[] Open, there is a variable
[] True, the expressions are the same for all the values of the variables.
[] False, the expressions are never the same.
its false or open because 17-8 = 9 and you cannot divide 8 by 9 so you will not find x
evaluate the expression for the given value of the variuble with step by step explanation
-4b-8 + -1-b^2 +2b^3 b=-2
Substitute the value of b = -2 to the expression
[tex]-4b-8+(-1)-b^2+2b^3=2b^3-b^2-4b-8-1=2b^3-b^2-4b-9\\\\2(-2)^3-(-2)^2-4(-2)-9=2(-8)-4+8-9=-16-4+8-9=-21[/tex]
Julie is opening a savings account at a bank that offers new clients 0.1% interest compounded quarterly. She deposits $1,700 when she opens the account.
Write an exponential expression in the form a(b)c, where b is a single value, to find the amount of money, in dollars, that will be in the account after t years. Round any decimals to the nearest hundred-thousandth and do not include dollar signs in the expression.
Initial amount deposited (a) = $1,700.
Rate of interest (c) = 0.1% compounded quarterly =0.001 quarterly = 0.001/4 = 0.00025.
Number of years = t.
Let us assume amount after t years would be = $b.
We know, compund interest formula.
Total balance = Deposited amount (1- rate of interrest)^time.
Plugging values in formula,
[tex]b = a (1+c)^t[/tex]
We have a=$1700, c =0.00025.
Plugging those values, we get
[tex]b=1700(1+0.00025)^t[/tex]
Or
[tex]b=1700(1.00025)^t[/tex]
1. Find the diameter of a circle whose circumference is 18.85 m. A. 3.46 m B. 12 m C. 6 m D. 2.45 m
18.85 = 3.14d
Divide both sides by 3.14
x=6
The answer is C. 6m
For this case we have to:
The circumference or perimeter of a circle is given by:
[tex]c = \pi d\\[/tex]
where d is the diameter of the circle.
Substituting the given value of c, [tex]c = 18.85m[/tex], we have:
[tex]18.85 = \pi d\\[/tex]
[tex]d = \frac{18.85}{\pi } \\\\d = 6\\[/tex]
Therefore, the diameter of the circle is 6m.
Answer:
Option C
Select the multiplication sentence that applies the commutative property of multiplication to the example.
Example: 6 × 8 = 48
A.
8 × 6 = 48
B.
24 × 2 = 48
C.
12 × 4 = 48
we are given
6 × 8 = 48
we know that
commutative property of multiplication:
[tex]a \times b =b \times a[/tex]
now, we will verify each options
option-A:
we have
6 × 8 = 48
now, we can find it's commutative
so, we get
8 × 6 = 48
so, this is TRUE
option-B:
we have
6 × 8 = 48
now, we can find it's commutative
so, we get
8 × 6 = 48
so, this is FALSE
option-C:
we have
6 × 8 = 48
now, we can find it's commutative
so, we get
8 × 6 = 48
so, this is FALSE
you are biking at a speed of 18 miles per hour you are 3 miles behind your friends who is biking at a speed of 12 miles per hour how amount of time it catch up to your friend
What is the answer to − 4/7 = 5/2t ( its a one step equation)
What is the value of 9y-9 given that -2y+6=2
Write a variable expressi on for *10 divided by the sum of y and 4
Answer:
x = 10 / (y + 4)
Step-by-step explanation:
What is the value of f(3) when f(x) = 4x + 1
Here is the equation:
[tex]f(x)=4x+1[/tex]
You need to find f(3). To do that, substitute all the x's with 3:
[tex]f(x)=4x+1 \rightarrow f(3)=4\times3 + 1[/tex]
The first thing you need to do is multiply 4 by 3. Multiply:
[tex]4 \times 3 = 12[/tex]
Here is your new equation:
[tex]f(3)=12+1[/tex]
To get your answer, you need to add 12 and 1. Add:
[tex]12+1 = 13[/tex]
That means:
[tex]\bf f(3)=13[/tex]
If you have any questions, feel free to ask in the comments! :)
F(x)= 4x+1
To find f(3) you substitute it into x.
F(3)= 4(3)+1
F(3)=12+1
F(3)=13
What's the area of a triangle with the base of seven over two And the height 5/8
What is the subset of 0, -3, and 8!!
the subset of -3 and 8 is: { }, {-3}, {8}, {-3,8}, {8,-3}
How can u solve this by graphing ?
*(Answer)*= (2,1)
*(Information)*= There is an attachment of the graph
math question, any help is appreciated <3
Since you already know the solution, you need to substitute every occurrence of x and y with those values: the first equation checks out, because it becomes
[tex] 3\cdot 4 - 2 \cdot 2 = 12-4 = 8 [/tex]
The second becomes
[tex] 2 \cdot 4 + 3 \cdot 2 = Q \iff 8+6 = Q \iff Q = 14 [/tex]
Given the graph below: What is the slope? ___________
What is the y intercept? _____________
What is the equation of the line in slope-intercept form? ____________________
What is the equation of the line in standard form? ____________
y-intercept: First, find the y-intercept: it crosses the y-axis at 5 so b = 5
slope: Next, find the slope by counting the rise over run from the y-intercept to another point: the point they provided is (3, 0), which which is down 5 and to the right 3 so m = [tex]-\frac{5}{3}[/tex]
slope-intercept form: Then, insert m = [tex]-\frac{5}{3}[/tex] and b = 5 into the slope-intercept equation: y = mx + b, so y = [tex]-\frac{5}{3}x[/tex] + 5
standard form: The standard equation Ax + By = C can be found by multiplying everything by the denominator and moving Ax and By to one side and the number to the other side. Remember that Ax must be positive.
y = [tex]-\frac{5}{3}x[/tex] + 5
3(y) = [tex](3)-\frac{5}{3}x[/tex] + (3)5
3y = -5x + 15
+5x +5x
5x + 3y = 15
Answers: m = [tex]-\frac{5}{3}[/tex], b = 5, y = [tex]-\frac{5}{3}x[/tex] + 5, 5x + 3y = 15
The number of yeast cells in a laboratory culture increases rapidly initially but levels off eventually. the population is modeled by the function n = f(t) = a 1 + be−0.5t where t is measured in hours. at time t = 0 the population is 20 cells and is increasing at a rate of 8 cells/hour. find the values of a and
b.
The values of a and b in the population function n = f(t) = a(1 + be-0.5t) are a = -40 and b = -1.5.
Explanation:The population of yeast cells in a laboratory culture can be modeled by the function n = f(t) = a(1 + be-0.5t). Given that at time t = 0 the population is 20 cells and is increasing at a rate of 8 cells/hour, we can find the values of a and b.
First, substitute the given values into the equation:
20 = a(1 + be0)
Next, find the derivative of the function with respect to t to find the rate of change:
f'(t) = -0.5abe-0.5t
Since the population is increasing at a rate of 8 cells/hour, we can set the derivative equal to 8:
8 = -0.5abe-0.5(0)
Now, we have two equations:
20 = a(1 + b)
8 = -0.5ab
Solving these equations simultaneously will give us the values of a and b.
Using the first equation, we can solve for b:
b = (20/a) - 1
Substituting this value of b into the second equation:
8 = -0.5a((20/a) - 1)
Simplifying and solving for a:
a = -40
Substituting the value of a back into the first equation to solve for b:
b = (20/(-40)) - 1 = -1.5
Therefore, the values of a and b are a = -40 and b = -1.5.
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At time t = 0, the population is 20 cells and is increasing at a rate of 8 cells/hour. After solving the equation, we find that a = 20 and b = 16.
Explanation:To find the values of a and b in the function n = f(t) = a(1 + be-0.5t), we can use the given information.
At time t = 0, the population is 20 cells and is increasing at a rate of 8 cells/hour.
This means that the derivative of the function with respect to time is equal to 8 at t = 0.
Using the chain rule, we can differentiate the function f(t) with respect to t and set it equal to 8 to solve for a and b.
After solving the equation, we find that the growth will be a = 20 and b = 16.
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What would you divide by ten to get 600000
Which of the following illustrates the truth value of the given statements? Sugar is sour, and lemons are sweet.
F F → F
T F → F
F T → F
T T → T
Which of the following illustrates the truth value of the given statements?
A triangle has four sides, and a rectangle has three sides.
T F → F
F T → F
T T → T
F F → F
Sugar is actually sweet and lemons are sour, both those statements are false so the answer is: F F → F
A triangle has 3 sides, a rectangle has 4, both those statements are also false, so the answer would be: F F → F
Answer:
F F → F F F → FStep-by-step explanation:
1)
We are given first statement as:
Sugar is sour, and lemons are sweet.
This is a false statement since both the statements are opposite.
Sugar is sweet while lemons are sour.
Hence, the truth value of the given statements is:
F F → F
2)
The statement is given as:
A triangle has four sides, and a rectangle has three sides.
It is again a false statement since a triangle is a polygon with three sides and a rectangle is a polygon with four sides.
Hence, both the statements given in it are false.
Hence, the answer is:
F F → F
What is the percent of change for 210 to 35
What is the place value of 9 in the number 9,000,009
In our (positional) numerical system, the first digit form the right represents the units, and going leftwards, every digit is worth 10 times more than its previous one.
So, in your number, the 9 to the right means "9 units", because it's the rightmost digit.
On the other hand, the leftmost 9 is worth 9 millions, because you shift 6 positions from the right, and the digits are worth:
1st digit from the right: units2nd digit from the right: tens3rd digit from the right: hundreds4th digit from the right: thousands5th digit from the right: tens of thousands6th digit from the right: hundreds of thousands7th digit from the right: millionsIn 9,000,009, the first '9' stands for nine million, and the second '9' represents nine, given its position in one's place. This is because the value of a numeral in any number varies depending on its position, which is determined by the place value concept.
Explanation:In the number 9,000,009, the digit '9' appears twice - once at the beginning (in the millions place) and once at the end (in the ones place). Each position of these two '9's has a different place value based on its position.
A clear understanding of the place value concept reveals that the first '9' (from left to right) is positioned in the millions place, which means it represents nine million, or 9,000,000 in numeric representation. The second '9' is in the one's place, representing simply '9.' Therefore, the place value of 9 in the number 9,000,009 can be either nine million or nine, depending on which '9' we are referring to.
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One number is 4 more than another. The difference between their squares is 56. What are the numbers?
To solve the given problem, we set up an equation based on the information that one number is 4 more than the other and the difference between their squares is 56. After simplifying the equation, we find that the numbers in question are 5 and 9.
Explanation:Let's denote the two numbers as n and n+4.
According to the problem, one number is 4 more than the other, and the difference between their squares is 56.
We can create an equation based on this information:
(n+4)^2 - n^2 = 56
Expanding the equation:
n^2 + 8n + 16 - n^2 = 56
The n^2 terms cancel out:
8n + 16 = 56
Subtracting 16 from both sides gives us:
8n = 40
Dividing by 8:
n = 5
The other number would be:
n+4 = 5+4
n+4 = 9
So, the two numbers are 5 and 9.
Final answer:
To find the numbers, set up an equation using variables. Solve for the variables to find the values of the numbers.
Explanation:
To solve this problem, let's assign variables to the numbers. Let the first number be x. Since the other number is 4 more than the first number, we can represent it as x + 4. The difference between their squares is 56, so we can set up the equation (x + 4)² - x² = 56.
Expanding the equation, we get x² + 8x + 16 - x² = 56. Simplifying further, we have 8x + 16 = 56. Subtracting 16 from both sides, we get 8x = 40. Dividing both sides by 8, we find x = 5.
So, the numbers are 5 and (5 + 4) = 9.