Answer:
6 to the power of 1 over 6
Answer:
The correct option is 4.
Step-by-step explanation:
The given interpretation is square root of the cube root of 6. The mathematical expression is
[tex]\sqrt{\sqrt[3]{6}}[/tex]
It can be written as
[tex]((6)^{\frac{1}{3})^{\frac{1}{2}}[/tex]
Using the property of exponent, we get
[tex](6)^{\frac{1}{3}\times \frac{1}{2}}[/tex] [tex][\because (x^m)^n=(x)^{mn}][/tex]
Now simplify the power.
[tex](6)^{\frac{1}{6}}[/tex]
The simplified form of given expression is 6 to the power of 1 over 6. Therefore the correct option is 4.
An electronics store reduced the price of a TV from $800 to $728. What was the percent of decrease?
Answer:
9%
Step-by-step explanation:
✯Hello✯
↪ We can formulate an equation to help us solve this
↪ 800(x%) = 728 in this case x=91
↪ We do 100-91 meaning that this is a 9% decrease on price
↪ To check that this is correct we can work out 9% of 800 which is 72
When subtracting 72 from 800 it is confirmed that 728 is the right amount
❤Gianna❤
Final answer:
To find the percent of decrease in the TV's price, calculate the difference between the original and the new price, divide by the original price, and multiply by 100, which results in a 9% decrease.
Explanation:
To calculate the percent of decrease when the price of a TV is reduced from $800 to $728, you subtract the new price from the original price and then divide by the original price. Next, you multiply the result by 100 to get the percentage.
Step-by-step calculation:
Find the difference in price: $800 - $728 = $72.
Divide the difference by the original price: $72 ÷ $800 = 0.09.
Multiply by 100 to get the percentage: 0.09 x 100 = 9%.
So, the percent of decrease in the price of the TV is 9%.
emilio writes the inequality 17(f+2) + 45.99<200 to better represent the situation, using the variable f to represent the number of friends. solve the inequality, then write the maximum nymber of friens attende the birthday party.
Expand the left hand side:
[tex]17f+34+45.99<200[/tex]
Simplify the left hand side:
[tex]17f+79.99<200[/tex]
Subtract 79.99 from both side:
[tex]17f<120.01[/tex]
Divide both sides by 17:
[tex]f<\dfrac{120.01}{17} \approx 7.06[/tex]
So, he must invite less than 7 friend to the party.
Final answer:
To solve the inequality, distribute 17 to f and 2, combine like terms, subtract 79.99 from both sides, and divide both sides by 17. The maximum number of friends that can attend the birthday party is 7.
Explanation:
To solve the inequality 17(f+2) + 45.99 < 200, we first distribute 17 to f and 2: 17f + 34 + 45.99 < 200. Combine like terms: 17f + 79.99 < 200. Next, subtract 79.99 from both sides of the inequality: 17f < 120.01. Finally, divide both sides of the inequality by 17: f < 7.06. So the maximum number of friends that can attend the birthday party is 7.
What linear function represents the line given by the point slope equation y+7= 2/3(x+6)?
Answer:
The graph of the line in the attached figure
Step-by-step explanation:
we have
[tex]y+7=\frac{2}{3}(x+6)[/tex]
This is the equation of a line into point slope form
The slope is [tex]m=\frac{2}{3}[/tex]
The line pass through the point (-6,-7)
To graph the line find the y-intercept
Remember that
The y-intercept of the line is the value of y when the value of x is equal to zero
so
For x=0
[tex]y+7=\frac{2}{3}(0+6)[/tex]
[tex]y+7=\frac{2}{3}(6)[/tex]
[tex]y+7=4[/tex]
[tex]y=4-7=-3[/tex]
The y-intercept is the point (0,-3)
with the point (-6,-7) and (0,-3) plot the line
see the attached figure
The sum of three positive numbers is 1. The difference between the first and second numbers is equal to the third number, while their sum is five times as large as the third number. What is the smallest of these numbers? pls answer quickly, 99 pts
Answer:
1/6
Step-by-step explanation:
The three numbers, a, b, c, satisfy the equations ...
a +b +c = 1a -b -c = 0a +b -5c = 0Subtracting the last equation from the first gives ...
(a +b +c) -(a +b -5c) = (1) -(0)
6c = 1
c = 1/6
Now, we know the sum of the first two numbers is 5/6 (five times the last), and the difference of the first two numbers is 1/6 (equal to the last). Then the least of the first two numbers is ...
(5/6 -1/6)/2 = 1/3
and the third number, 1/6, is shown to be the smallest.
The smallest of these numbers is 1/6.
____
In order, the numbers are 1/2, 1/3, 1/6.
____
Comment on finding the second-smallest number
For ...
a +b = 5/6 . . . . . sum of the two numbersa -b = 1/6 . . . . . . difference of the two numbersWe can find b by subtracting the second equation from the first:
(a +b) -(a -b) = (5/6) -(1/6)
2b = 4/6 = 2/3 . . . . . simplify
b = 1/3 . . . . . . . . . . . . divide by 2
Please note that half the difference of the sum and difference is the generic solution to finding the smallest in a "sum and difference" problem.
What is the slope of the line?
A. 0
B. 1
C. Undefined
D. Infinity
A. 0
The slope of a horizontal line is always 0.
Last month Rachel power walked 2 1/5 miles per day on each of the 10 days. During the same week, she also joggged 8 1/4 Miles per days on 3 days. What was the total number of miles Rachel power walked and jogged last month?
she went a total of 46.75 miles
Given: circle k(O), m∠P=95°, m∠J=110°, m∠LK=125°
Find: m∠PJ
Answer:
The measure of the arc PJ is [tex]75\°[/tex]
Step-by-step explanation:
step 1
Find the measure of angle L
we know that
In a inscribed quadrilateral opposite angles are supplementary
so
[tex]m<L+m<J=180\°[/tex]
we have
[tex]m<J=110\°[/tex]
substitute
[tex]m<L+110\°=180\°[/tex]
[tex]m<L=70\°[/tex]
step 2
Find the measure of arc KJ
we know that
The inscribed angle measures half that of the arc comprising
so
[tex]m<P=\frac{1}{2}(arc\ LK+arc\ KJ)[/tex]
substitute the values
[tex]95\°=\frac{1}{2}(125\°+arc\ KJ)[/tex]
[tex]190\°=(125\°+arc\ KJ)[/tex]
[tex]arc\ KJ=190\°-125\°=65\°[/tex]
step 3
Find the measure of arc PJ
we know that
The inscribed angle measures half that of the arc comprising
so
[tex]m<L=\frac{1}{2}(arc\ PJ+arc\ KJ)[/tex]
substitute the values
[tex]70\°=\frac{1}{2}(65\°+arc\ PJ)[/tex]
[tex]140\°=(65\°+arc\ PJ)[/tex]
[tex]arc\ PJ=140\°-65\°=75\°[/tex]
Which inequality represents the interval of tenths that the square root of 14 lies between?
Answer:
3.7 < √14 < 3.8
Step-by-step explanation:
First approximation
9 < 14 < 16, so
3 < √14 < 4
Second approximation
14 is closer to 16 than to 9.
Is √14 between 3.7 and 3.8? If so, then
3.7² < 14 < 3.8²
13.69 < 14 < 14.44. TRUE
The inequality is 3.7 < √14 < 3.8.
Need help on this please
Answer:
The answer is -3t(t^4 - 6t² - 1) ⇒ third answer
Step-by-step explanation:
∵ -3t^5 + 18t³ + 3t
∵ The common factor is -3t
∴ -3t(t^4 - 6t² - 1)
what is the equation of the line through (5,1) with a slope of -3?
a. y+1 = 3(x+5)
b. y-1 = 3(x-5)
c. y-1 = -3(x-5)
d. y+1 = -3(x-5)
Answer:
C
Step-by-step explanation:
The equation of a line is given by the formula [tex]y-y_1=m(x-x_1)[/tex]
Where [tex]x_1[/tex] is the x-coordinate (it is given as 5)
[tex]y_1[/tex] is the y-coordinate (it is given as 1), and
m is the slope (it is given as -3)
Plugging in all the info into the formula we have:
[tex]y-y_1=m(x-x_1)\\y-1=-3(x-5)[/tex]
From the answer choices, we see that C is the correct answer.
Answer:
c.y-1 = -3(x-5)
Step-by-step explanation:
We have given slope of a line and the point that is passing through the line.
slope = -3 and (x₁,y₁) = (5,1)
We have to find the equation of line.
y-y₁ = m(x-x₁) is point-slope form of the equation of line where m is slope.
Putting given values in above formula, we have
y-(1) = -3(x-(5))
y-1 = -3(x-5) is the equation of the line through (5,1) with a slope of -3.
a point is chosen at random in a large square what percent of the time will the point be in the shaded region
Answer:
84.5%
Step-by-step explanation:
The area of the smaller square is ...
smaller square = (5.98 cm)^2 = 35.7604 cm^2
The area of the larger square is ...
larger square = (15.2 cm)^2 = 231.04 cm^2
So, the shaded area is ...
larger square - smaller square = (231.04 -35.7604) cm^2 = 195.2796 cm^2
Then a randomly chosen point will be in the shaded region this fraction of the time:
(shaded area)/(larger square area) = 195.2796/231.04 ≈ 0.84522 ≈ 84.5%
In the equation kx^2 + 5x = 10k, find the other root if one root is -5.
Subtract 10k from both sides:
[tex] kx^2+5x-10k = 0 [/tex]
Assuming [tex]k\neq 0[/tex], divide both sides by k:
[tex] x^2+\dfrac{5}{k}x-10 = 0[/tex]
When you write a quadratic equation as [tex]x^2-sx+p [/tex], you know that the two solutions follow the properties
[tex]x_1+x_2=s,\quad x_1x_2=p [/tex]
So, in this case, we have
[tex]x_1+x_2=-\dfrac{5}{k},\quad x_1x_2=-10 [/tex]
Since we know that [tex]x_1=-5[/tex] we have:
[tex]\begin{cases}-5+x_2=-\dfrac{5}{k}\\ -5x_2=-10\end{cases}[/tex]
This system has solution [tex]k=\frac{5}{3},\ x=2[/tex]
Answer:
2
Step-by-step explanation:
One root = -5
We know ,
Product of roots = c/a-5 * x = -10k / k -5x = -10 x = 2Other root is 2 .
Given circle assume that AB Is tangent to the circle and AD Passes through the center of the circle. If the circle has a radius of 5CM and AB is 6CM what is the length of the secant
Answer:
d. 2√34 cm
Step-by-step explanation:
Secant BD is the hypotenuse of right triangle ABD with legs given as AB = 6 cm and AD = 10 cm. Hence the Pythagorean theorem can be used to find BD:
BD = √(AB² +AD²) = √((6 cm)² +(10 cm)² = √136 cm = 2√34 cm
Loliidewkwkwkwkkdjieejwjwm
Answer:
1234567890
Step-by-step explanation:
1234567890-zxhjk
How much would $500 invested at 9% interest compounded continuously be worth after 4 years? Round your answer to the nearest cent.
Answer:
=705.79
Step-by-step explanation:
F=P(1+i)n where F is the Future amount P is the Present amount/Capital i is the interest rate n is the number of periods.
In this case you have the given as follows:
P = $500 i = 9% n = 4 years
Substituting the values to the formula you'll have:
F=500(1+0.09)^4
=705.79
What is a perfect square? 20,21,24,25
What is rotation?
A translation that leaves the origin fixed while not losing the shape of the curves
A translation that changes the origin while not losing the shape of the curves
A translation that leaves the origin fixed while changing the shape of the curves
A translation that changes the origin while also changing the shape of the curves
The right choice is (C) A translation that leaves the origin fixed while changing the shape of the curve
Step-by-step explanation:A transformation in which the center of rotation is fixed and everything else on the plane rotates about that point by a given angle is called rotation. A rotation is described by the centre of rotation, the angle of rotation, and the direction of the turn. The centre of rotation is the point that a shape rotates around. Each point in the shape must stay an equal distance from the centre of rotation.
Answer: a translation that leaves the origin fixed while not losing the shapes of the curves
Step-by-step explanation:
HELP Find the number of non-degenerate triangles whose vertices are three of the points on this six-point star.
Answer:
20
Step-by-step explanation:
The number of combinations of 6 points taken 3 at a time is ...
6!/(3!·(6-3)!) = 6·5·4/(3·2·1) = 5·4 = 20
___
If you number the points 1–6, the points of the 20 triangles will be ...
123 124 125 126 134
135 136 145 146 156
234 235 236 245 246
256 345 346 356 456
Mr. Burnam decided to go hot air ballooning for his fortieth birthday. He launches from 6 feet above ground and then ascends 12 feet further. He didn't want to leave his wife behind, so he descends 20 feet to meet her. Where does mr. Burnam end up?
Answer:
2 feet below the ground level at the place where he started.
Step-by-step explanation:
After he adds 12 feet of elevation to the 6 feet above ground level where he launched, Mr Burnam is 6+12 = 18 feet above the ground level where he launched.
If he descends 20 feet, he will be 18 -20 = -2 feet above the ground level where he launched. That is, he is 2 feet below the ground level where he launched. We hope the ground slopes downward somewhat so Mr Burnam is not buried in the ground at that point.
Mr. Burnam ends up at 8 feet above ground.
To determine Mr. Burnam's final position, we need to consider each of his movements:
1. He starts from 6 feet above ground.
2. He ascends 12 feet further, so we add 12 feet to his initial height of 6 feet, which gives us (6 + 12 = 18) feet.
3. Then, he descends 20 feet to meet his wife. We subtract these 20 feet from his current height of 18 feet, which gives us (18 - 20 = -2) feet.
Since he can't be below ground, we adjust the calculation to reflect that he stops at ground level. Therefore, we take the absolute value of the result to find out how far above ground he is after the descent. The absolute value of -2 feet is 2 feet.
Now, we add this to the initial 6 feet from which he launched: (6 + 2 = 8) feet.
So, Mr. Burnam ends up at 8 feet above ground after all the ascending and descending.
How do I find The first figure is dilated to form the second figure.
Which statement is true?
A. The scale factor is 0.25.
B. The scale factor is 4.
C. The scale factor is 4.35.
D. The scale factor is 7.25.
Answer:
The marked choice is correct
Step-by-step explanation:
The scale factor is the ratio of the dimensions of the second figure to those of the first:
1.45/5.8 = 0.25
Answer:The scale factor is 0.25. Trust me, its right!
If for all real values of x, (x + c)(x + 4) = x2 + 8x + 4c, then c = ?
A. 2
B. 4
C. 6
D. 8
E. 10
Answer:
B. 4
Step-by-step explanation:
When you perform the multiplication, you get ...
(x +c)(x +4) = x² + (c+4)x +4c = x² + 8x +4c
Then ...
c + 4 = 8 . . . . coefficients of x must match
c = 4 . . . . . matches choice B
A hot iron ball of mass 200 g is cooled to a temperature of 22°C. 6.9 kJ of heat is lost to the surroundings during the process. What was the initial temperature of the ball? (ciron = 0.444 J/g°C)
Answer:
99.7 °C
Step-by-step explanation:
The units of ciron tell us that in order to have °C in the numerator, we need to divide the heat loss by the product of the mass and ciron:
∆T = (6900 J)/(0.444 j/g°C × 200 g) = 69/0.888 °C ≈ 77.7 °C
This is the change in temperature as the ball cooled, so its initial temperature was ...
22 °C +77.7 °C = 99.7 °C
I need help with 1.12 and 1.13
Answer:
1.12 B. sin(s) = cos(u)
1.13 C. showing similar triangles
Step-by-step explanation:
1.12 First of all, it is useful to identify the complementary angles. These are the two acute angles in the same right triangle: (s, u) or (t, v), or the adjacent angles that together make a right ange: (s, t) or (u, v).
Only choices B and D involve complementary angles. Only choice B shows the right relationship between trig functions of those angles.
___
1.13 It helps if you've seen the short, cute proof of the Pythagorean theorem using similar triangles. One of the early steps in the proof is to show the triangles are similar: choice C.
Even if you've never seen that proof, you can still make a good guess as to the correct choice. Choices A and D are just plain incorrect. Choice B might be the end result of the proof of the Pythagorean theorem, but won't be a step in that proof. In any event, the point of the proof is to show AC^2 + BC^2 = AB^2, not the equation of choice B.
That leaves choice C, which is both correct and likely to be a step in the proof.
Determine whether a triangle can be formed with the given side lengths. If so, use Heron's formula to find the area of the triangle.
a = 240
b = 127
c = 281
Answer:
area of the triangle is about 15,183.766
Step-by-step explanation:
The sum of the two shortest sides is 367, which is greater than the longest side, hence these side lengths can form a triangle.*
The perimeter is ...
p = 240 +127 +281 = 648
so the semi-perimeter is ...
s = p/2 = 648/2 = 324
Heron's formula tells you the area is ...
A = √(s(s -a)(s -b)(s -c)) = √(324·84·197·43) = √230,546,736
A ≈ 15,183.766
The area of the triangle is about 15,183.766 square units.
_____
* The terms s-a, s-b, and s-c are all positive, which is further evidence the side lengths will form a triangle. If one or more of those factors is negative, the side lengths will not form a triangle.
Find the average rate of change for f(x) = x2 + 7x + 10 from x = −20 to x = −15. A) −28 B) −36 C) 28 D) 36
Answer:
Step-by-step explanation:
Answer:
The average rate of change of [tex]f(x)=x^2 + 7x + 10[/tex] over the interval [tex]-20\leq x\leq -15[/tex] is -28.
Step-by-step explanation:
The average rate of change of function f(x) over the interval a ≤ x ≤ b is given by this expression:
[tex]\frac{f(b)-f(a)}{b-a}[/tex]
It is a measure of how much the function changed per unit, on average, over that interval.
To find the average rate of change of [tex]f(x)=x^2 + 7x + 10[/tex] over the interval [tex]-20\leq x\leq -15[/tex] you must:
Evaluate x = -15 and x = -20 into the function f(x)
[tex]f(-15)=(-15)^2 + 7(-15) + 10=130\\f(-20)=(-20)^2 + 7(-20) + 10=270[/tex]
Applying the expression for the average rate of change we get
[tex]\frac{f(-15)-f(-20)}{-15+20} \\\\\frac{130-270}{-15+20} \\\\\frac{-140}{5}\\\\-28[/tex]
HELP help me find the arc of the semicircle found in the picture
Shouldn’t it be 180 because that half of a circle (360)
I think this should be it!
Betsy, a recent retiree, requires $5000 per year in extra income. She has $70000 to invest and can invest in B-rated bonds paying 15% per year or in a certificate of deposit (CD) paying 5% per year. How much money should be invested in each to realize exactly $5000 in interest per year?
Answer:
$15000 in bonds, $55000 in a CD
Step-by-step explanation:
Let x represent the amount Betsy invests in the B-rated bonds (in thousands). Then she will invest 70-x in a CD. Her interest (in thousands) will be ...
0.15x + .05(70 -x) = 5
0.10x + 3.5 = 5 . . . . . . . eliminate parentheses, collect terms
x + 35 = 50 . . . . . . . . . . multiply by 10
x = 15 . . . . . . . . . . . . . . . subtract 35
Then 70-x = 70-15 = 55
Betsy should invest $15000 in bonds, and $55000 in a CD.
To achieve $5000 in annual interest, Betsy should invest $15000 in B-rated bonds and $55000 in CDs.
Betsy, a recent retiree, requires $5000 per year in extra income. She has $70000 to invest and is considering two options: B-rated bonds paying 15% per year and certificates of deposit (CD) paying 5% per year. To find out how much she should invest in each to realize exactly $5000 in interest per year, we can set up a system of linear equations.
Let x be the amount invested in B-rated bonds and y be the amount invested in CDs. The equations based on the investment and the total interest required would be:
x + y = $700000.15x + 0.05y = $5000To solve this system, multiply the second equation by 100 to get rid of decimals:
15x + 5y = 500000Now, we can multiply the first equation by 5 to get:
5x + 5y = 350000Subtracting this from the modified second equation:
(15x + 5y) - (5x + 5y) = 500000 - 35000010x = 150000x = $15000Plug the value of x back into the first equation:
15000 + y = 70000y = $55000Betsy should invest $15000 in B-rated bonds and $55000 in a CD to achieve $5000 in annual interest.
A rectangle is drawn on a coordinate plane. Three vertices of the rectangle are points
A(−7,2)
B(3,2)
, and
D(−7,−2)
Point C is the fourth vertex of the rectangle.
What is the distance from point B to point C?
Enter your answer in the box.
Answer:
4
Step-by-step explanation:
The distance from B to C is the same as the distance from A to D. Points B and C will both have the same x-value, as do points A and D. Points B and C will have the same difference in y-values (2 -(-2) = 4) that points A and D have.
The distance from B to C is 4 units.
PLEASE HELP!!!!!!!!!!!!!!!!!!
Answer:
it is d
Step-by-step explanation:
Answer:
b. secants
Step-by-step explanation:
A line that intersects a circle in two places is called a "secant."
___
It is a tangent line if it intersects the circle in one point.
It is a diameter if it is a chord that goes through the center of the circle.
It is a chord if it is a line segment with each endpoint being on the circle. (BE and CD are chords.)
"Cosecant" is the name of the trigonometric function that is the ratio of the hypotenuse of a right triangle to the side opposite the angle of interest.
Two friends live 27 miles apart. They left their houses at the same time and started to walk towards each other at 4 mph and 5 mph respectively. How soon did they meet?
Answer:
They meet in 3 hours
Step-by-step explanation:
Add 4 and 5, this gives you 9 miles an hour. Divide 27 by 9 and it results in 3 hours