First you must acknowledge that you are dealing with a line therefore you must write linear equation or linear function in this case.
Linear function has a form of,
[tex]y=mx+n[/tex]
Then calculate the slope m using the coordinates of two points. Let say A(x1, y1) and B(x2, y2),
[tex]m=\dfrac{\Delta{y}}{\Delta{x}}=\dfrac{y_2-y_1}{x_2-x_1}[/tex]
Now pick a point either A or B and insert coordinates of either one of them in the linear equation also insert the slope you just calculated, I will pick point A.
[tex]y_1=mx_1+n[/tex]
From here you solve the equation for n,
[tex]
y_1=mx_1+n\Longrightarrow n=y_1-mx_1
[/tex]
So you have slope m and variable n therefore you can write down the equation of the line,
[tex]f(x)=m_{slope}x+n_{variable}[/tex]
Hope this helps.
r3t40
William says that 15 yeas from now, his age will be 3 times his age 5 years ago. If x x represents William present age, complete the following sentence
A 15 years
B 18 years
C x-15=3(x-5)
D x+15=3(x-5)
Answer:
I don't know what the following sentence is:
But D is the equation to represent the situation
and A is what turns out to be his current age.
(If you want more help, on this question please post the following sentence).
Step-by-step explanation:
Let x represent the current age.
15 years from now his age is 3 times his age 5 years ago means we have the equation:
x+15=3(x-5)
(I added x to 15 because we said 15 years in the future)
Let's solve this to see if makes any sense just for fun:
Distribute:
x+15=3x-15
Add 15 on both sides:
x+30=3x
Subtract x on both sides:
30=2x
Divide both sides by 2:
15=x
So this means his current age is 15.
5 years ago his age would have been 10.
15 years in the future his age will be 30.
Is 30 equal to 3 times 10? Yes, it is! The equation does make sense.
Answer:
D,
Step-by-step explanation:
x is the present age of William, 15 years from now is x+15, and that is equal to 3 times 3() the age he had 5 years ago (x-5)., the equation is x+15=3(x-5)
expand and simplify 4(2x+3)+4(3x+2)
To expand and simplify the expression 4(2x+3)+4(3x+2), distribute the 4 to both sets of parentheses and combine like terms to get 20x + 20.
Explanation:To expand and simplify the expression 4(2x+3)+4(3x+2), we can use the distributive property of multiplication over addition. The distributive property states that for any numbers a, b, and c, a(b+c) = ab+ac.
First, we distribute the 4 to both terms inside the first set of parentheses: 4 * 2x + 4 * 3. This simplifies to 8x + 12. Then, we distribute the 4 to both terms inside the second set of parentheses: 4 * 3x + 4 * 2. This simplifies to 12x + 8.
Combining the like terms, the final simplified expression is: 8x + 12 + 12x + 8 = 20x + 20.
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Help me on this math question please
Answer:
its simplest form is 4/5
VERY EASY WILL GIVE BRAINLEST THANK YOU AND FRIEND YOU Determine whenter (18+35)x4= 18+35x4 is true or false. Explain.
Answer:
False because on the left side of the equation you are adding 18 and 35 first and on the right you are multiplying 35 and 4 first. This will give you an unequal equation when solved.
Let's solve each side
(18+35)*4=212
but 18+(35*4)=158
What are the explicit equation and domain for a geometric sequence with a first term of 2 and a second term of -8
Answer:
[tex]\large\boxed{a_n=2(-4)^{n-1}=\dfrac{(-4)^n}{2}}[/tex]
Step-by-step explanation:
The explicit equation of a geometric sequence:
[tex]a_n=a_1r^{n-1}[/tex]
The domain is the set of all Counting Numbers.
We have the first term of [tex]a_1=2[/tex] and the second term of [tex]a_2=-8[/tex].
Calculate the common ratio r:
[tex]r=\dfrac{a_{n-1}}{a_2}\to r=\dfrac{a_2}{a_1}[/tex]
Substitute:
[tex]r=\dfrac{-8}{2}=-4[/tex]
[tex]a_n=(2)(-4)^{n-1}\qquad\text{use}\ \dfrac{a^n}{a^m}=a^{n-m}\\\\a_n=(2\!\!\!\!\diagup^1)\left(\dfrac{(-4)^n}{4\!\!\!\!\diagup_2}\right)\\\\a_n=\dfrac{(-4)^n}{2}[/tex]
Answer:
Step-by-step explanation:
A geometric sequence has a common ratio. in this case the common ratio
r = -8/2 = -4.
The explicit formula is an = 2(-4)^(n-1).
ANY HELP IF POSSIBLE THANK YOU :)
Answer:
See explanation
Step-by-step explanation:
There 2 black shapes (one circle and one square) and 2 white shapes (1 circle and 1 square).
1. The ratio of the number of white shapes to the number of black shapes is 2:2=1:1.
2. The ratio of the number of white circls to the number of black squares is 1:1.
3. The ratio of the number of black circles to the number of black squaress is 1:1.
4. There are 4 shapes and 2 are circles (1 white and 1 black), so circles are [tex]\dfrac{2}{4}=\dfrac{1}{2}[/tex] of all shapes.
A man received 7 per cent interest on a loan of $800 for one year. How much interest did he receive? A.) $56 B.) $560 C.) $780 D.) $870 D.) None of these
Answer:
A.) $56
Step-by-step explanation:
1. Convert 7% into the numerical version by either
A. Moving the decimal two spaces to the right, giving us .07
or
B. Making 7% into a fraction, 7/100
2. Now make an equation with the total amount of money (M) multiplied by the interest (P) inside of parenthesis. This will give us 7% of $800 in your case.
(800 × .07) → 56
3. Then, multiply by the number of years the interest has been accumulated.
56 × 1
The official equation for this is: a = p(1 + r)^t
a = amount at end (initial amount + interest gained)
p = initial amount
r = rate (percent interest)
t = time in years
The correct option will be option A: Man will receive $56 interest in a year.
How to calculate simple interest?Simple Interest amount can be calculated by the product of principal amount, rate of interest, and time.
Simple Interest= S.I. =p*t*r/100
where p is the principal amount,
r is interest rate (in %)
t is the time (in year).
Here, given,
principal amount P = $800
rate of interest= r=7%
time=t=1 year
using the above formula,
Simple Interest S.I.= p*t*r/100= (800*1*7)/100= $56
Therefore man will receive $56 interest in a year.
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Help me with quistion 1 and 2
Answer:
1.B
first picture is x greater than or equal to 4
second picture is x less than or equal to 4
then x>4 is a open circle and a line to the right
then x<4 to the left
Step-by-step explanation:
.
Solve the triangle.
B = 72°, b = 12, c = 8 (1 point)
Answer:
a=11.8,b=12,c=8,A=68.7°, B=72°, C= 39.3°
Step-by-step explanation:
Given data:
b = 12
c= 8
a= ?
∠B= 72°
∠C= ?
∠A=?
To find the missing angle we will use law of sine:
a/sinA=b/sinB=c/sinC
Find m∠C.
b/sinB = c/sinC
Substitute the values:
12/sin72°=8/sinC
Apply cross multiplication.
12*sinC=sin72° * 8
sinC=0.951*8/12
sinC=7.608/12
sinC= 0.634
C= 39.3°
Now we know that the sum of angles = 180°
So,
m∠A+m∠B+m∠C=180°
m∠A+72°+39.3°=180°
m∠A=180°-72°-39.3°
m∠A= 68.7°
Now find the side a:
a/sinA=b/sinB
a/sin68.7°=12/sin72°
Apply cross multiplication:
a*sin72°=12*sin68.7°
a*0.951=12*0.931
a=0.931*12/0.951
a=11.172/0.951
a=11.75
a=11.8 ....
20 POINTS!!!
Test the residuals of two other points to determine how well the line of best fit models the data. (the two points are orange circle and yellow square (53,52) and (55,55)
Answer:
the line will pass through yellow and red
Solve for x. Please show work.
Answer:
First exercise: [tex]x=7[/tex]
Second exercise: [tex]x=2[/tex]
Step-by-step explanation:
Acording to the Intersecting Secants Theorem the products of the segments of two secants that intersect each other outside a circle, are equal.
Based on this, in order to solve the first exercise and the second exercise, we can write the following expressions and solve for "x":
First exercise:
[tex](5)(5+x)=6(6+4)\\\\25+5x=60\\\\5x=60-25\\\\x=\frac{35}{5}\\\\x=7[/tex]
Second exercise:
[tex](4)(4+x)=3(3+5)\\\\16+4x=24\\\\4x=24-16\\\\x=\frac{8}{4}\\\\x=2[/tex]
The weight of a adult blue whale is 9x10^4 kilograms; the weight of an elephant is 3x10^3 kilograms. How many times heavier is the whale than the elephant?
Answer:
30 times
Step-by-step explanation:
Weight of adult blue whale = [tex]9 \times 10^{4}[/tex] kilogram
Weight of an elephant = [tex]3 \times 10^{3}[/tex] kilogram
In order to find how many times a quantity is as compared to the other quantity, we divide the two. So here we have to divide the weight of adult blue whale by the wight of elephant.
[tex]\frac{9 \times 10^{4}}{3 \times 10^{3}}\\= 30[/tex]
This means, adult blue whale is 30 times heavier than the elephant.
A ball is dropped from the top of a building that is 1,000 feet high. Its height, in feet, as a function of the time, x, in seconds, after the ball was dropped, is given by the following equation, ƒ(x) = 1,000 - 16x 2. Which set of numbers is appropriate as the domain for this function?
Natural Numbers
Positive Real Numbers
Positive Integers
Positive Rational Numbers
Answer:
Positive real numbers
Step-by-step explanation:
The domain is all the possible values of x. Here, x represents the time that the ball falls.
Natural numbers are integers greater than 0 (1, 2, 3, etc.). However, the time doesn't have to be an integer (for example, x=1.5).
Positive integers are the same as natural numbers.
Positive rational numbers are numbers greater than 0 that can be written as a ratio of integers (1/1, 3/2, 2/1, etc.). However, the time can also be irrational (for example, x=√2).
Positive real numbers are numbers greater than 0 and not imaginary (don't contain √-1). This is the correct domain of the function.
The domain for the function ƒ(x) = 1,000 - 16x^2 is Positive Real Numbers.
The domain for the function ƒ(x) = 1,000 - 16x^2 is a set of Positive Real Numbers. This is because in real-world situations, such as the height of an object, negative time values do not make sense, and the function itself involves squaring x, which ensures that the result is positive. Therefore, the appropriate set of numbers as the domain for this function would be Positive Real Numbers.
A baseball field is in a shape of a square. The distance between each pair of bases along the edge of the square is 90 feet. What is the distance between home plate and second bass?
Answer:
8100
Step-by-step explanation:
Step-by-step explanation:
We want to find the length of the square's diagonal. Since the square has right angles, we can use Pythagorean theorem.
c² = a² + b²
x² = 90² + 90²
x = 90√2
x ≈ 127.3 feet
Find the area of the shaded region if the dimensions of the unshaded region are 18ft x 22ft. Use 3.14 for π as necessary.
A. 1,419.84 ft²
B. 1,111.84 ft²
C. 709.92 ft²
D. 957.84 ft²
See the attached picture:
Answer:
Answer is option B. 1,111.84 ft²
Step-by-step explanation:
The given dimensions of the un shaded region or rectangle are 18 feet x 22 feet.
Now we have additional 7 feet at both ends to form the diameter of the semicircle, making it [tex]14+18=32[/tex] feet
Radius = [tex]\frac{32}{2}=16[/tex] feet
We have 2 semicircles, one at each end. If we combine it it forms a circle.
Area of the circle (2 semicircles) = [tex]\pi r^{2}[/tex]
= [tex]3.14\times(16)^{2}[/tex] = 803.84 square feet
Now we will find the area of the shaded rectangles above and below the non shaded one. The length is 22 feet and width is 7 feet.
So, area = [tex]22\times7=154[/tex] square feet
We have 2 similar rectangles. So, area of both = [tex]2\times154=308[/tex] square feet
So, total area of shaded region = [tex]803.84+308=1111.84[/tex] square feet.
How would you answer this math geometric question
Answer:
* The shorter side is 270 feet
* The longer side is 540 feet
* The greatest possible area is 145800 feet²
Step-by-step explanation:
* Lets explain how to solve the problem
- There are 1080 feet of fencing to fence a rectangular garden
- One side of the garden is bounded by a river so it doesn't need
any fencing
- Consider that the width of the rectangular garden is x and its length
is y and one of the two lengths is bounded by the river
- The length of the fence = 2 width + length
∵ The width = x and the length = y
∴ The length of the fence = 2x + y
- The length of the fence = 1080 feet
∴ 2x + y = 1080
- Lets find y in terms of x
∵ 2x + y = 1080 ⇒ subtract 2x from both sides
∴ y = 1080 - 2x ⇒ (1)
- The area of the garden = Length × width
∴ The area of the garden is A = xy
- To find the greatest area we will differentiate the area of the garden
with respect to x and equate the differentiation by zero to find the
value of x which makes the area greatest
∵ A = xy
- Use equation (1) to substitute y by x
∵ y = 1080 -2x
∴ A = x(1080 - 2x)
∴ A = 1080x - 2x²
# Remember
- If y = ax^n, then dy/dx = a(n) x^(n-1)
- If y = ax, then dy/dx = a (because x^0 = 1)
∵ A = 1080x - 2x²
∴ dA/dx = 1080 - 2(2)x
∴ dA/dx = 1080 - 4x
- To find x equate dA/dx by 0
∴ 1080 - 4x = 0 ⇒ add 4x to both sides
∴ 1080 = 4x ⇒ divide both sides by 4
∴ x = 270
- Substitute the value of x in equation (1) to find the value of y
∵ y = 1080 - 2x
∴ y = 1080 - 2(270) = 1080 - 540 = 540
∴ y = 540
* The shorter side is 270 feet
* The longer side is 540 feet
∵ The area of the garden is A = xy
∴ The greatest area is A = 270 × 540 = 145800 feet²
* The greatest possible area is 145800 feet²
Multiply. Express your answer in simplest form.
1 7/8 × 2 1/3
Answer:
4 3/8
Step-by-step explanation:
1 7/8 × 2 1/3
Change the numbers to improper fractions
1 7/8 = (8*1 +7) /8 = 15/8
2 1/3 = (3*2 +1)/3 = 7/3
15/8 * 7/3
Rearranging
15/3 * 7/8
5/1 * 7/8
35/8
Now we need to change this back to a mixed number
8 goes into 35 4 times with 3 left over
4 3/8
Answer:
35/8 or 4 3/8
Step-by-step explanation:
Change each fraction to improper
15/8 * 7/3
multiply
105/24
reduce
35/8
make it mixed if the answer wants it to be
4 3/8
How many passwords can be formed using six numbers if the first and last number cannot be zero?
Most likely infinite? Just a guess.
Answer:
Step-by-step explanation:
The question says nothing about repetition, so I'm assuming that 943449 is OK,
This can be solved this way
9 10 10 10 10 9
810,000
factor completely 4x^2-8x-60
Answer:
4(x - 5)(x + 3)
Step-by-step explanation:
Given
4x² - 8x - 60 ← factor out 4 from each term
= 4(x² - 2x - 15)
To factor the quadratic
Consider the factors of the constant term ( - 15) which sum to give the coefficient of the x- term ( - 2)
The factors are - 5 and + 3, since
- 5 × 3 = - 15 and - 5 + 3 = - 2, hence
x² - 2x - 15 = (x - 5)(x + 3) and
4x² - 8x - 60 = 4(x - 5)(x + 3)
15 points!!
What do you think? And why?
eric runs 3 miles in 28 minutes. at the same rate how many miles would he run in 42 minutes?
(9x-4)-(3x+2) I need to know how to solve this
[tex](9x-4)-(3x+2)=9x-4-3x-2=6x-6[/tex]
Solve exponential equations
5x − 2=625
Answer:
x = 6Step-by-step explanation:
[tex]5^{x-2}=625\\\\5^{x-2}=5^4\qquad(5^4=5\cdot5\cdot5\cdot5=625)\\\\5^{x-2}=5^4\Rightarrow x-2=4\qquad\text{add 2 to both sides}\\\\x-2+2=4+2\\\\x=6\\\\\text{check:}\\\\5^{6-2}=5^4=625\qquad\bold{CORRECT}[/tex]
Steps for solving 6x - 18 = 54 are shown.
Explain how Step 1 helps solve the equation.
Answer:
x = 12
Step 1 helps solve the equation, for it helps isolate the x, which is what you are solving for.
Step-by-step explanation:
Isolate the variable x. Note the equal sign, what you do to one side, you do to the other. Do the opposite of PEMDAS:
Step 1: Add 18 to both sides.
6x - 18 (+18) = 54 (+18)
6x = 54 + 18
6x = 72
Step 2: Divide 6 from both sides:
(6x)/6 = (72)/6
x = 72/6
x = 12
x = 12 is your answer.
~
Answer:
[tex]\huge \boxed{X=12}[/tex]
Step-by-step explanation:
Add by 18 from both sides of equation.
[tex]\displaystyle 6x-18+18=54+18[/tex]
Add numbers from left to right.
[tex]\displaystyle 54+18=72[/tex]
[tex]\displaystyle 6x=72[/tex]
Divide by 6 from both sides of equation.
[tex]\displaystyle \frac{6x}{6}=\frac{72}{6}[/tex]
Simplify, to find the answer.
[tex]\displaystyle 72\div6=12[/tex]
[tex]\huge \boxed{x=12}[/tex], which is our answer.
What is the length of the altitude of the equilateral triangle below?
[tex]\bf \textit{height or altitude of an equilateral triangle}\\\\ h=\cfrac{s\sqrt{3}}{2}~~ \begin{cases} s=\stackrel{length~of}{a~side}\\ \cline{1-1} s=8\sqrt{3} \end{cases}\implies h=\cfrac{8\sqrt{3}\cdot \sqrt{3}}{2}\implies h=\cfrac{8\sqrt{3^2}}{2} \\\\\\ h=4\cdot 3\implies h=12[/tex]
Fred the clown can create 202020 animal balloons every 151515 minutes.
Complete the table using equivalent ratios.
Minutes Number of animal balloons
151515 202020
666
454545
Answer:
Dividing the number of balloon animal per the time he takes to make them you get an average of how many animals per minute Fred the clown can make.20/15=1,3 animals per minuteSince 0,3 is not a complete animal, the correct answer would be "Fred the clown can make 1 animal in 1 minute
Answer: 15 : 20
6 : 8
45 : 60
Step-by-step explanation:
First, you have to divide both numbers by 15:
15//15 = 1
20/15 = 4/3
Now you know that Fred can create 4/3 animal balloons in 1 minute.
If he spent 6 minutes creating animal balloons, then he can create 6 times as many animal balloons:
4/3 x 6 = 8
Now that we figured out the first part, we need to figure out how many he can make in 45 minutes.
We can do this by doing the same thing as we did for the first part, except we multiply 4/3 by 45 minutes:
4/3 x 45 = 60
Now that we figured out both parts, we know that our final answer should be:
15 : 20
6 : 8
45 : 60
Hope this helped! <3
What is the equation of the new function???
Answer:
The correct answer option is C. [tex] g ( x ) = | x - 4 | + 6 [/tex].
Step-by-step explanation:
We know that the transformation which shifts a function along the horizontal x axis is given by [tex]f(x+a)[/tex], while its [tex]f(x-a)[/tex] which shifts the function to the right side.
Here we are to shift the function 4 units to the right and 6 units up.
Therefore, the function will be:
[tex] g ( x ) = | x - 4 | + 6 [/tex]
Answer: Option C
[tex]g (x) = | x-4 | +6[/tex]
Step-by-step explanation:
If we have a main function and perform a transformation of the form
[tex]g (x) = f (x + h)[/tex]
So:
If [tex]h> 0[/tex] the graph of the function g(x) will be equal to the graph of f(x) displaced h units to the left
If [tex]h <0[/tex] the graph of the function g(x) will be equal to the graph of f(x) displaced h units to the right
Also if the transformation is done
[tex]g (x) = f(x) + k[/tex]
So
If [tex]k> 0[/tex] the graph of the function g(x) will be equal to the graph of f(x) displaced k units up
If [tex]k <0[/tex] the graph of the function g(x) will be equal to the graph of f(x) displaced k units downwards.
In this case the main function is [tex]f(x) = | x |[/tex] and moves 4 units to the right and 6 units to the top, then the transformation is:
[tex]g (x) = f (x-4) +6[/tex]
[tex]g (x) = | x-4 | +6[/tex]
A non-food crop is infected by pests on the 1st of a month. The pests infect the crop in such a way that the area infected doubles after each month. If the pests continue to infect the crop in this way, the non-food crop will be entirely infected after the sixth month.
After which month will one-eighth of the non-food crop be infected?
Answer:
After month 3.
Step-by-step explanation:
If you know that the crop will be completely infected after 6 months and the area infected doubles each month, you can work backwards. So picture the 6th month as 100%. Then, basically divide that percentage by 2 until you reach 1/8, or .125, or 12.5. So 100% (month 6) > 50% (month 5) > 25% (month 4) > 12.5% (month 3). So 12.5% is equal to 1/8 or .125, which is what you are trying to look for.
Hope this helps!
The non-food crop will be infected by one-eighth of the crop after 3 months.
What is the sum of n terms in a geometric sequence?The sum of n terms of a geometric sequence is given by the formula,
Sn = [a(1 - r^n)]/(1 - r)
Where r - a common ratio
a - first term
n - nth term
Sn - the sum of n terms
Calculation:Given that,
The crop is infected by pests.
The area infected doubles after each month. So, it forms a geometric progression or sequence.
The entire crop is infected after six months.
So, n = 6, r = 2(double) and consider a = x
Then the area of the infected crop after 6 months is,
S(6) = [x(1 - 2^6)]/(1 - 2)
= x(1 - 64)/(-1)
= -x(-63)
= 63x
So, after six months the area of the infected crop is about 63x
So, the one-eighth of the crop = 63x/8 = 7.875x
For one month the infected area = x (< one-eighth)
For two months it will be x + 2x = 3x (< one-eighth)
For three months it will be x + 2x + 4x = 7x ( < one-eighth)
For four months it will be x + 2x + 4x + 8x = 15x (> one-eighth)
So, the one-eighth of the crop will be infected after 3 months.
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what’s the trapezoids missing length?
Answer:
Step-by-step explanation:
Let CD = x
(x + 40)/2 = 31 The midline is 1/2 the sum of the 2 bases. multiply by 2 on both sides.
x + 40 = 31 * 2
x + 40 = 62 Subtract 40 from both sides.
x +40-40 = 62 - 40 Combine
x = 22
Check
(22 + 40)/2
62 / 2
31 = PQ
To find the missing length of a trapezoid with similar triangles inside, we use the ratio of the sides of the triangles, which is approximately 8.667 based on the provided lengths.
Explanation:When determining the missing length of a trapezoid, we need to consider the properties of similar triangles or the geometric shape of a trapezoid itself. The given information suggests a scenario where similar triangles are within a trapezoid and leads to a proportional relationship between the sides of the triangles. If a trapezoid has triangles within it that share an angle, the lengths of the corresponding sides of those triangles will be proportional.
Based on the data provided, if the long sides of the triangles are in the ratio of 13.0 in to 1.5 in, which simplifies to an approximate factor of 8.667, the bottom sides of the triangles - which are the parallel sides of the trapezoid - will also be in the same ratio. By finding the length of the shorter bottom side, we can divide the length of the longer bottom side by 8.667 to get the missing length on the shorter side.
Which parent function does Andy’s data best represent?