The triangle with points at (2, 4), (4, 2), (9, 6) was reflected across the line y = 3 to get the points (2, 2), (4, 4), (9, 0)
What is a transformation?Transformation is the movement of a point from its initial point to a new location. Types of transformation are reflection, rotation, translation and dilation.
The triangle with points at (2, 4), (4, 2), (9, 6) was reflected across the line y = 3 to get the points (2, 2), (4, 4), (9, 0)
Find out more on transformation at: https://brainly.com/question/4289712
#SPJ1
(2a-x): ( b * 2x) be the sub-duplicate ratio of ab, then the value of x ^ 1 is
Answer:
x^2=ab
Step-by-step explanation:
Please mark as brainlist
Given that Log 10^2=0.301 and log10^3= 0.477, find the value of log10^6
This value is approximate
=======================================================
Work Shown:
[tex]\log_{10}(2) \approx 0.301\\\\\log_{10}(3) \approx 0.477\\\\\log_{10}(6) = \log_{10}(2*3)\\\\\log_{10}(6) = \log_{10}(2)+\log_{10}(3) \ \text{ see note below}\\\\\log_{10}(6) \approx 0.301 + 0.477\\\\\log_{10}(6) \approx 0.778\\\\[/tex]
Note: I used the rule that log(A*B) = log(A)+log(B) which works for any valid log base.
Step-by-step explanation:
Since the question has already been answered, I'd like to add something new, and explain why: [tex]log_b(a*c)=log_ba+log_bc[/tex]
So let's just say that:
[tex]x=log_ba[/tex] and that [tex]y=log_bc[/tex]
This means that: [tex]b^x=a[/tex] and that [tex]b^y=c[/tex].
So if we were to multiply the two, a and c. You get
[tex]a*c=b^{x+y}[/tex]
This is due to the exponent identity that: [tex]b^a*b^c=b^{a+c}[/tex]
So if you rewrite this in logarithmic form you get:
[tex]log_b{ac}=x+y[/tex]
and remember what x and y are equal to? that's right, it's the logarithms
so now you substitute the logarithms back in and get
[tex]log_b{ac} = log_ba+log_bc[/tex]
[tex]6/5 (cos(120) + isin(120)) 3/5 (cos(45) + i sin(45))[/tex]
The product is equal to:
[tex]\frac{18}{25}(cos(165) + i*sin(165))[/tex]
How to solve the product?Remember that we can write a complex number in polar form as:
[tex]R*e^{i*a} = R*(cos(a) + i*sin(a))[/tex]
Then the given product:
[tex]\frac{6}{5}*(cos(120) + i*sin(120))*\frac{3}{5}*(cos(45) + i*sin(45))[/tex]
can be rewritten to:
[tex](\frac{6}{5}*e^{i*120})*(\frac{3}{5}*e^{i*45})[/tex]
Now is easier to solve the product:
[tex](\frac{6}{5}*e^{i*120})*(\frac{3}{5}*e^{i*45})\\\\= \frac{6}{5} *\frac{3}{5} *e^{i*(120 + 45)}\\\\= \frac{18}{25}*e^{i*165}\\\\= \frac{18}{25}(cos(165) + i*sin(165))[/tex]
If you want to learn more about complex numbers:
https://brainly.com/question/10662770
#SPJ1
At a hockey game, a vender sold a combined total of 235 sodas and hot dogs. The number of hot dogs sold was 59 less than the number of sodas sold. Find the number of sodas sold and the number of hot dogs sold.
Answer:
147 sodas88 hot dogsStep-by-step explanation:
This problem is similar to many others in which the sum of two quantities and their difference are given. The solution can be found easily when the equations for the relations are written in standard form.
SetupLet s and h represent numbers of sodas and hot dogs sold, respectively. The given relations are ...
s +h = 235 . . . . . combined totals -h = 59 . . . . . . difference in the quantitiesSolutionAdding the two equations eliminates one variable.
(s +h) +(s -h) = (235) +(59)
2s = 294 . . . . simplify
s = 147 . . . . . .divide by 2
h = 147 -59 = 88 . . . . h is 59 less
147 sodas and 88 hot dogs were sold.
__
Additional comment
The solution to a "sum and difference" problem is always the same. One of the numbers is half the sum of those given, and the other is half their difference. ((235-59)/2 = 88)
Which statements about the graph of the function f(x) = -x² - 4x + 2 are true? Select three options.
The domain is {x|x ≤-2}.
The range is {yly ≤ 6}
The function is increasing over the interval (-∞, -2).
The function is decreasing over the interval (-4,00).
The function has a positive y-intercept
Answer:
The range is {y l y ≤ 6}.The function is increasing over the interval (-∞, -2).The function has a positive y-intercept.Step-by-step explanation:
The attached graph shows the graph opens downward, so the vertex at (-2, 6) is a maximum. The y-intercept is the constant, +2.
RangeThe range is the vertical extent of the function. Its upper limit is the maximum value of the function (6), and its lower limit is negative infinity.
The range is {y l y ≤ 6}.
IncreasingThe graph opens downward, so it is increasing to the left of its maximum value, and decreasing to the right of its maximum. The x-coordinate of the maximum (-2) defines the upper limit of the increasing interval.
The function is increasing over the interval (-∞, -2).
Y-interceptThe y-intercept of the graph is where it crosses the y-axis. The value of x is zero there, so the value of the function is the value of its constant, +2.
The function has a positive y-intercept.
Part A: How many sides does a parallelogram have?
Part B: How are the opposite angles of parallelograms related?
Part C: If mA = 115° and m/B = 65°, determine m/C and m/D. Show your work.
A) A parallelogram has 4 sides.
B) The opposite angles of parallelogram are congruent.
C) [tex]\angle A \cong \angle C, \angle B \cong \angle D\\\\\implies m\angle C=115^{\circ}, m\angle D=65^{\circ}[/tex]
Which of the following is the equivalent expression for (x + 2)(x - 2)? LIKE PLS HELP
50 POINTS HELP/BRAINIEST
GEOMETRY
The construction of a tangent to a circle given a point outside the circle can be justified using the second corollary to the inscribed angle theorem. An alternative proof of this construction is shown below. Complete the proof
Given: Circle C is constructed so that CD = DE = AD; CA is a radius of circle C.
Prove: AE is tangent to circle C.
Answer:
Proof:
By the inscribed angle theorem, we know that angle BAC is equal to angle DEC. By the second corollary to the inscribed angle theorem, we know that line segment AE is perpendicular to line segment AC. Therefore, line segment AE is tangent to circle C.
Step-by-step explanation:
Analyze and ensure the answer is correct.
Answer:
Step-by-step:
By the inscribed angle theorem, we know that angle BAC is equal to angle DEC. By the second corollary to the inscribed angle theorem, we know that line segment AE is perpendicular to line segment AC. Therefore, line segment AE is tangent to circle C.
Find the mean of the data in the dot plot below. students size of each of mr. sirac's classes 21 20 22 23 24 25 26 28 27 number of students show calculator report a stuck? watch a video or use a hint.
The mean of the data about students size of Mr. Sirac classes is 24.
Given students size of each of Mr. Sirac'sclasses 21,20,22,23,24,25,26,28,27 and we have to find the mean of the data.
We know that mean is the basically sum of numbers divided by the number. It is also known as average.
Mean =∑X/n where n is number of values and ∑X is sum of all the values.
∑X=21+20+22+23+24+25+26+28+27
=216
n=9
Mean is calculated by dividing sum by n.
Mean =216/9
=24
Hence the mean of the data about students size of each of Mr. Sirac classes is 24.
Learn more about mean at https://brainly.com/question/1136789
#SPJ4
Solve the equation for
The equation solved for w is w = 6g - 40
How to solve the equation?The complete question is in the attached image
The equation is given as:
g = 1/6(w + 40)
Multiply both sides by 6
6g = w + 40
Subtract 40 from both sides
w = 6g - 40
Hence, the equation solved for w is w = 6g - 40
Read more about equations at:
https://brainly.com/question/12895249
#SPJ1
HELP ME ANSWER THIS PLEASE
By using the table, we see that the correct options are:
a) f(2) = 7
b) f(x) = 3 when x = 8.
c) f⁻¹(7) = 2
d) f⁻¹(x) = 8 when x = 3.
How to use the information in the table?Here we have a table of x and f(x).
First, we want to find f(2). To get that, we need to go to the row where we have x = 2.
In that same row we can see that f(x) = 7.
Then f(2) = 7.
Then it says:
"if f(x) = 3, then x = ?"
This time we do the opposite. We find the row where f(x) = 3, and then we see the value of x in that row.
In the second row (counting from the bottom) we can see that when x = 8, f(x) = 3.
Then:
"if f(x) = 3, x = 8"
Then we want to get the inverse of f(x) evaluated in 7.
Here we use the rule:
[tex]f(x) = y\\f^{-1}(y) = x[/tex]
Then
[tex]f(2) = 7\\f^{-1}(7) = 2[/tex]
The answer here is 2.
Finally:
"if the inverse evaluated in x si 8, then what is the value of x"
Similar to before, we know that when we evaluate f(x) in 8, the outcome is 3.
Then when we evaluate the inverse in 3, the outcome is 8.
So here we must have x = 3.
If you want to learn more about inverse functions:
https://brainly.com/question/14391067
#SPJ1
Perform the calculation then round to the appropriate number of significant digits. 129 ÷ 3.332 Perform the calculation then round to the appropriate number of significant digits . 129 ÷ 3.332
The calculation of 129 ÷ 3.332 rounded to the appropriate number of significant digits is 39.
What is division of the two numbers?
Given that;
129 ÷ 3.332
First we convert 3.332 to fraction
3.332 = 3.332/1
3.332 = 3.332/1 × 1000/1000 = 3332/1000
3.332 = 833/250
Hence we have;
129 ÷ 833/250
This can be written as
= 129 × 250/833
= 32250/833
= 38.71549 ≈ 39
Therefore, the calculation of 129 ÷ 3.332 rounded to the appropriate number of significant digits is 39.
Learn more about divisions here: https://brainly.com/question/21416852
#SPJ1
Bonds have a maturity risk premium that can be modeled as the following:
MRP = (t-1) 0.3%
were t represents the years to maturity.
What is the Maturity risk premium of a bond that matures in 10 years?
answer in % without the symbol
Answer:
.
Step-by-step explanation:
Graph the solution set of this inequality: 3x -2y ≥ 12
The slope m = 3/2 and the y-intercept = ( 0, -6 ).
The graph is a solid line and shaded area below the boundary line since y is less than (3/2)x - 6.
What is the Graph the solution set of the inequality?Given that:
3x -2y ≥ 12
First we write the inequality in slope intercept form y = mx + b.
Solve for y
3x -2y ≥ 12
-2y ≥ 12 - 3x
Now, divide each term by -2
y ≤ -6 + 3x/2
We re-arrange
y ≤ (3/2)x - 6
Using the slope intercept form y = mx + b. we can see that;
m = 3/2
b = -6
Hence, the slope m = 3/2 and the y-intercept = ( 0, -6 ).
The graph is a solid line and shaded area below the boundary line since y is less than (3/2)x - 6.
Learn more about inequality here: https://brainly.com/question/13790048
#SPJ1
Whats the correct answer answer asap
Answer:
C
Step-by-step explanation:
it just is
There are 3 people at a party. If each person must shake hands with every other person at the party exactly once,how many handshakes will there be ?
Suppose ABCD is a rectangle. Find AB and AD if point M is the midpoint of BC,
AM 1MD, and the perimeter of ABCD is 34 in.
Answer:
Step-by-step explanation:
determine the range of the relation {(10,3), (8,9), (16,10)}
The range of the given relation is: range = { 3, 9, 10}
What is Range?Range is the out come of the event is know as y.
Here, the given relation:
R = {(0,3), (8,9), (16,10)
Now, range = { 3, 9, 10}
Thus, the range of the given relation is: range = { 3, 9, 10}
Learn more about Range from:
https://brainly.com/question/15697193
#SPJ1
What is the truth value for the following conditional statement?
p: true
q: true
p → q
T T → F
T T → T
F T → T
T F → T
Based on the conditional statement given, the truth value can be found to be T T → T.
How do we find the truth value?
The truth value can be found by using the Boolean Table which is shown as:
p q p → q
T T T
T F F
F T T
F F T
From the table, we can then see that if both p and q are true, then p → q is true as well.
We will then have a truth value of T T → T.
Find out more on truth value for conditional statements at https://brainly.com/question/2770634.
#SPJ1
A fish tank has a length of 12 cm a width of 15 cm and a depth of 25 cm find the volume of the fish tank.. any indian here..
Answer:
our volume is 4500cm³
Step-by-step explanation:
note: the following will be assuming that this fish tank is rectangular, as most fish tanks are
To find the volume of a rectangular structure, we multiply :
length × width × height
here, we know our
length to be 12 cm
width to be 15 cm
and height/depth to be 25 cm
so, we can follow our volume formula (length × width × height) using these values
length × width × height = volume
12 × 15 × 25 = 4500
so, our volume is 4500cm³
(also called 4500cubic centimeters)
(we write volume as cubed--units³)
hope this helps! have a lovely day :)
PLS HELP ILL GIVE 5 STARS
The entrance to a business is 4 feet above the ground. The business is required to build an accessibility ramp with a slope of 1/12. How far from the entrance will the ramp need to begin
Answer:
4² + b² = 12²
16 + b² = 144
b² = 144 - 16
b² = 128
b = √128
b = 11.3 feet
Step-by-step explanation:
what is the median of the data set? 9, 3, 10, 12, 4, 5, 12, 2
Answer:
8
Step-by-step explanation:
12+4=16
16 divided by 2= 8
Translate the English phrase into an algebraic expression: the difference of f and the quotient of g and h.
Answer:
f-(g/h) is an algebraic expression of the difference of f and the quotient of g and h.
Step-by-step explanation:
[tex]f - ( \frac{g}{h} )[/tex]
I hope it was helpful for you..m
The requried algebraic expression of English phrase is given as f - g/h.
What is an algebraic expression?The algebraic expression consists of constants and variables. eg x, y, z, etc.
What is the equation?the equation is the relationship between variables and represented as y = ax + b is an example of a polynomial equation.
here,
The difference between f and the quotient of g and h.
The difference represents the subtraction of values, and the quotient can be obtained by division of g by h.
So,
Required algebraic expression,
= f - g/h
Thus, the required expression is given as f - g/h.
Learn more about algebraic expression here:
https://brainly.com/question/953809
#SPJ2
In 2003, a school population was 1219. By 2009 the population had grown to 1987.
1) How much did the population grow between the year 2003 and 2009?
students
2) How long did it take the population to grow from 1219 students to 1987 students?
years
3) What is the average population growth per year?
P =
students/year
4) What was the population in the year 2000?
students
5) Find an equation for the population, P, of the school t years after 2000.
:
6) Using your equation, predict the population of the school in 2012.
students
1) Between the years 2003 and 2009, 768 students joined the school.
2) It took 6 years for the population to grow from 1219 students to 1987 students.
3) The average population growth per year is 128 students per year.
P = 128 students per year
4) The population of students in the year 2000 was a total of 835 students.
5) 1219 + (p3) = 1987
6) 1987 + (p3) = 2371
P3 = 384
5X-20 =18O what is x?
Answer:
Step-by-step explanation:
x=40
Answer:
here is
Step-by-step explanation:
5x-20=180
5x=180+20
=200
X=200/5
40
A nurse must administer 180 micrograms atropine sulfate. This drug is available in solution form. The concentration of the atropine sulfate solution is 500 micrograms per milliliter. How many milliliters should be given? Simplify your answer.
Answer:
0.36ml
Step-by-step explanation:
Note: micrograms = [tex]10^{-6} g[/tex]
Given the concentration,
[tex]500*10^{-6} g = 1ml\\1*10^{-6}g =\frac{1}{500} ml\\180*10^{-6} g=(\frac{1}{500} *180)ml\\180micrograms = 0.36ml[/tex]
The pie is cut into 15 equal slices
Shade 1/5 of the pie
Need help with this one step by step please? A.
500 meters
B.
360 meters
C.
63 meters
D.
1,000 meters
Answer:
B. 360 meters
Step-by-step explanation:
The triangles shown are similar, so their corresponding parts are proportional.
SetupThere are a couple of useful proportions here. We can equate the ratio of horizontal segments to the ratio of diagonal segments:
(600 m)/(250 m) = ??/(150 m)
Or, we can equate the ratios of the diagonal segment to the corresponding horizontal segment:
??/(600 m) = (150 m)/(250 m)
SolutionEither way, when we multiply the equation by the denominator of ??, we get the result ...
?? = (600)(150/250) m = 360 m
The distance from F to G is 360 meters.
function g(x) : Five more than the opposite of 3 times the square of a number increased by 4 times the number
Answer:
[tex]g(x)= -3x^{2} +4x +5[/tex]
Step-by-step explanation:
Five more = Addition of 5
Opposite = (-)
3 times = Multiplication by 3
Square = To the power (exponent) of two
4 times the number = Multiplication by 4
The number = unknown number = x
this i algebra pic click this question
Answer:The answer is 27.04
Step-by-step explanation:
The solution is in the attached