Answer:
220 glasses.
Step-by-step explanation:
Quantity of fruit juice = 13 liters 200 ml
Number of glasses of each capacilty 60ml can be filled = ?
The quantity of fruit juice has 2 units. one is liter and the other is milliliter.
So we will convert liter into milliliter.
We have the quantity 13 liters 200 ml:
We know that:
1 liter = 1000 ml
Hence we have 13 liters so 13 will be multiplied by 1000 to convert it into milliliter.
13 * 1000 = 13000 ml
Now we have 13000 ml 200ml
Notice that we have two milliliters, so we will add both the quantities to make it one.
(13000+200)ml = 13200ml
Total quantity of fruit juice = 13200ml
Now divide the total quantity by the capacity of 60ml
=13200ml/60ml
= 220 glasses
It means that 220 glasses can be filled....
For a circle of radius 3 feet, find the arc length s subtended by a central angle of 21°.
Step-by-step explanation:
Length of arc = (Central Angle/360) × 2
[tex]\pi[/tex]
r
= 21/360 × 2 × 3.14 × 3
Length = 1.099 feet
Please mark Brainliest if this helps!
Answer:
Your answer is [tex]\frac{7\pi}{20}[/tex].
If you prefer an answer rounded to nearest hundredths you would have 1.10 or just 1.1.
Step-by-step explanation:
The formula for finding the arc length s is given by:
[tex]s=r \cdot \frac{\theta \pi}{180^\circ}[/tex]
where [tex]\theta[/tex] is in degrees.
Plug in 3 for r and 21 for [tex]theta[/tex]:
[tex]s=3 \cdot \frac{21 \pi}{180}[/tex]
I'm going to reduce 21/180 by dividing top and bottom by 3:
[tex]s=3 \cdot \frac{7 \pi}{60}{/tex]
I'm going to multiply 3 and 7:
[tex]s=\frac{21 \pi}{60}[/tex]
I'm going to reduce 21/60 by dividing top and bottom by 3:
[tex]s=\frac{7\pi}{20}[/tex]
Your answer is [tex]\frac{7\pi}{20}[/tex].
If you prefer an answer rounded to nearest hundredths you would have 1.10 or just 1.1.
The center of a circle is at the origin on a coordinate grid. The vertex of a parabola that opens upward is at (0, 9). If the circle intersects the parabola at the parabola’s vertex, which statement must be true?
The maximum number of solutions is one.
The maximum number of solutions is three.
The circle has a radius equal to 3.
The circle has a radius less than 9.
Answer:
"The maximum number of solutions is one."
Step-by-step explanation:
Hopefully the drawing helps visualize the problem.
The circle has a radius of 9 because the vertex is 9 units above the center of the circle.
The circle the parabola intersect only once and cannot intercept more than once.
The solution is "The maximum number of solutions is one."
Let's see if we can find an algebraic way:
The equation for the circle given as we know from the problem without further analysis is so far [tex]x^2+y^2=r^2[/tex].
The equation for the parabola without further analysis is [tex]y=ax^2+9[/tex].
We are going to plug [tex]ax^2+9[/tex] into [tex]x^2+y^2=r^2[/tex] for [tex]y[/tex].
[tex]x^2+y^2=r^2[/tex]
[tex]x^2+(ax^2+9)^2=r^2[/tex]
To expand [tex](ax^2+9)^2[/tex], I'm going to use the following formula:
[tex](u+v)^2=u^2+2uv+v^2[/tex].
[tex](ax^2+9)^2=a^2x^4+18ax^2+81[/tex].
[tex]x^2+y^2=r^2[/tex]
[tex]x^2+(ax^2+9)^2=r^2[/tex]
[tex]x^2+a^2x^4+18ax^2+81=r^2[/tex]
So this is a quadratic in terms of [tex]x^2[/tex]
Let's put everything to one side.
Subtract [tex]r^2[/tex] on both sides.
[tex]x^2+a^2x^4+18ax^2+81-r^2=0[/tex]
Reorder in standard form in terms of x:
[tex]a^2x^4+(18a+1)x^2+(81-r^2)=0[/tex]
The discriminant of the left hand side will tell us how many solutions we will have to the equation in terms of [tex]x^2[/tex].
The discriminant is [tex]B^2-4AC[/tex].
If you compare our equation to [tex]Au^2+Bu+C[/tex], you should determine [tex]A=a^2[/tex]
[tex]B=(18a+1)[/tex]
[tex]C=(81-r^2)[/tex]
The discriminant is
[tex]B^2-4AC[/tex]
[tex](18a+1)^2-4(a^2)(81-r^2)[/tex]
Multiply the (18a+1)^2 out using the formula I mentioned earlier which was:
[tex](u+v)^2=u^2+2uv+v^2[/tex]
[tex](324a^2+36a+1)-4a^2(81-r^2)[/tex]
Distribute the 4a^2 to the terms in the ( ) next to it:
[tex]324a^2+36a+1-324a^2+4a^2r^2[/tex]
[tex]36a+1+4a^2r^2[/tex]
We know that [tex]a>0[/tex] because the parabola is open up.
We know that [tex]r>0[/tex] because in order it to be a circle a radius has to exist.
So our discriminat is positive which means we have two solutions for [tex]x^2[/tex].
But how many do we have for just [tex]x[/tex].
We have to go further to see.
So the quadratic formula is:
[tex]\frac{-B \pm \sqrt{B^2-4AC}}{2A}[/tex]
We already have [tex]B^2-4AC}[/tex]
[tex]\frac{-(18a+1) \pm \sqrt{36a+1+4a^2r^2}}{2a^2}[/tex]
This is t he solution for [tex]x^2[/tex].
To find [tex]x[/tex] we must square root both sides.
[tex]x=\pm \sqrt{\frac{-(18a+1) \pm \sqrt{36a+1+4a^2r^2}}{2a^2}}[/tex]
So there is only that one real solution (it actually includes 2 because of the plus or minus outside) here for x since the other one is square root of a negative number.
That is,
[tex]x=\pm \sqrt{\frac{-(18a+1) \pm \sqrt{36a+1+4a^2r^2}}{2a^2}}[/tex]
means you have:
[tex]x=\pm \sqrt{\frac{-(18a+1)+\sqrt{36a+1+4a^2r^2}}{2a^2}}[/tex]
or
[tex]x=\pm \sqrt{\frac{-(18a+1)-\sqrt{36a+1+4a^2r^2}}{2a^2}}[/tex].
The second one is definitely includes a negative result in the square root.
18a+1 is positive since a is positive so -(18a+1) is negative
2a^2 is positive (a is not 0).
So you have (negative number-positive number)/positive which is a negative since the top is negative and you are dividing by a positive.
We have confirmed are max of one solution algebraically. (It is definitely not 3 solutions.)
If r=9, then there is one solution.
If r>9, then there is two solutions as this shows:
[tex]x=\pm \sqrt{\frac{-(18a+1)+\sqrt{36a+1+4a^2r^2}}{2a^2}}[/tex]
r=9 since our circle intersects the parabola at (0,9).
Also if (0,9) is intersection, then
[tex]0^2+9^2=r^2[/tex] which implies r=9.
Plugging in 9 for r we get:
[tex]x=\pm \sqrt{\frac{-(18a+1)+\sqrt{36a+1+4a^2(9)^2}}{2a^2}}[/tex]
[tex]x=\pm \sqrt{\frac{-(18a+1)+\sqrt{36a+1+324a^2}}{2a^2}}[/tex]
[tex]x=\pm \sqrt{\frac{-(18a+1)+\sqrt{(18a+1)^2}}{2a^2}}[/tex]
[tex]x=\pm \sqrt{\frac{-(18a+1)+18a+1}{2a^2}}[/tex]
[tex]x=\pm \sqrt{\frac{0}{2a^2}}[/tex]
[tex]x=\pm 0[/tex]
[tex]x=0[/tex]
The equations intersect at x=0. Plugging into [tex]y=ax^2+9[/tex] we do get [tex]y=a(0)^2+9=9[/tex].
After this confirmation it would be interesting to see what happens with assume algebraically the solution should be (0,9).
This means we should have got x=0.
[tex]0=\frac{-(18a+1)+\sqrt{36a+1+4a^2r^2}}{2a^2}[/tex]
A fraction is only 0 when it's top is 0.
[tex]0=-(18a+1)+\sqrt{36a+1+4a^2r^2}[/tex]
Add 18a+1 on both sides:
[tex]18a+1=\sqrt{36a+1+4a^2r^2[/tex]
Square both sides:
[tex]324a^2+36a+1=36a+1+4a^2r^2[/tex]
Subtract 36a and 1 on both sides:
[tex]324a^2=4a^2r^2[/tex]
Divide both sides by [tex]4a^2[/tex]:
[tex]81=r^2[/tex]
Square root both sides:
[tex]9=r[/tex]
The radius is 9 as we stated earlier.
Let's go through the radius choices.
If the radius of the circle with center (0,0) is less than 9 then the circle wouldn't intersect the parabola. So It definitely couldn't be the last two choices.
Answer:
Option A.
Step-by-step explanation:
A circle was drawn with the center at origin (0, 0) and a point (0, 9) on the circle.
So the radius will be r = [tex]\sqrt{(0-0)+(0-9)^{2}}=9[/tex]
Equation of this circle will be in the form of x² + y² = r²
Here r represents radius.
So the equation of the circle will be x² + y² = 9²
Or x² + y² = 81
Now we will form the equation of the parabola having vertex at (0, 9)
y² = (x - h)² + k
where (h, k) is the vertex.
Equation of the parabola will be y² = (x - 0)² + 9
y² = x² + 9
Now we will replace the value of y² from this equation in the equation of circle to get the solution of this system of the equations.
x² + x² + 9 = 81
2x² = 81 - 9
2x² = 72
x²= 36
x = ±√36
x = ±6
Since circle and parabola both touch on a single point (0, 9) therefore, there will be only one solution that is x = 6.
For x = 6,
6² + y² = 9²
36 + y² = 81
y² = 81 - 36 = 45
y = √45 = 3√5
Option A. will be the answer.
Drag the tiles to the correct boxes to complete the pairs. Match the functions to their x-intercepts.
1) f(x)= log x-1
2) f(x)= -(log x-2)
3) f(x)= log (-x-2)
4) f(x)= -log -(x-1)
a) (0,0)
b) (-3,0)
c) (10,0)
d) (100,0)
Answer:
See below in bold.
Step-by-step explanation:
The x intercepts occur when f(x) = 0.
1. logx - 1 = 0
logx = 1
By the definition of a log ( to the base 10):
x = 10^1 = 10
So the x-intercept is c (10,0).
2. - (logx - 2) = 0
logx - 2 = 0
log x = 2
so x = 100.
So it is d (100,0).
3 . log(-x - 2) = 0
-x - 2 = 10^0 = 1
-x = 3
x = -3
So it is b (-3, 0).
4. f(x) = -log -(x - 1)
log - (x - 1) = 0
log 1 = 0
so -(x - 1) = 1
- x + 1 = 1
x = 1-1 = 0
So it is a. (0,0).
Function x-intercept
[tex]f(x)=\log x-1[/tex] [tex](10,0)[/tex]
[tex]f(x)=-(\log x-2)[/tex] [tex](100,0)[/tex]
[tex]f(x)=\log (-x-2)[/tex] [tex](-3,0)[/tex]
[tex]f(x)=-\log -(x-1)[/tex] [tex](0,0)[/tex]
Step-by-step explanation:We know that the x-intercept of a function is the point where the function value is zero.
i.e. the x where f(x)=0
1)
[tex]f(x)=\log x-1[/tex]
when [tex]f(x)=0[/tex] we have:
[tex]\log x-1=0\\\\i.e.\\\\\log x=1\\\\i.e.\\\\\log x=\log 10[/tex]
Hence, taking the exponential function on both the sides of the equation we have:
[tex]x=10[/tex]
The x-intercept is: (10,0)
2)
[tex]f(x)=-(\log x-2)[/tex]
when, [tex]f(x)=0[/tex]
we have:
[tex]-(\log x-2)=0\\\\i.e.\\\\\log x-2=0\\\\i.e.\\\\\log x=2\\\\i.e.\\\\\log x=2\cdot 1\\\\i.e.\\\\\log x=2\cdot \log 10\\\\i.e.\\\\\log x=\log (10)^2[/tex]
Since,
[tex]m\log n=\log n^m[/tex]
Hence, we have:
[tex]\log x=\log 100[/tex]
Taking anti logarithm on both side we get:
[tex]x=100[/tex]
Hence, the x-intercept is:
(100,0)
3)
[tex]f(x)=\log (-x-2)[/tex]
when
[tex]f(x)=0[/tex]
we have:
[tex]\log (-x-2)=0\\\\i.e.\\\\\log (-x-2)=\log 1[/tex]
On taking anti logarithm on both the side of the equation we get:
[tex]-x-2=1\\\\i.e.\\\\x=-2-1\\\\i.e.\\\\x=-3[/tex]
Hence, the x-intercept is: (-3,0)
4)
[tex]f(x)=-\log -(x-1)[/tex]
when,
[tex]f(x)=0\ we\ have:[/tex]
[tex]-\log -(x-1)=0\\\\i.e.\\\\\log -(x-1)=0\\\\i.e.\\\\\log -(x-1)=\log 1\\\\i.e.\\\\-(x-1)=1\\\\i.e.\\\\x-1=-1\\\\i.e.\\\\x=-1+1\\\\i.e.\\\\x=0[/tex]
Hence, the x-intercept is: (0,0)
A number from 22 to 29 is drawn out of a bag at random. What is the theoretical probability of NOT drawing 28?
Answer:
Probability = 5/6
Step-by-step explanation:
Between 22 and 29, 28 can only come once.There are a total of 6 numbers between 22 and 29 (23, 24, 25, 26, 27, 28).Step 1: Write the formula of probability
Probability = number of possible outcomes/total number of outcomes
There is only one 28 so the chance of getting a 28 is 1/6.
Not getting a 28 would mean getting any one number from 23, 24, 25, 26 and 27.
Step 2: Apply the probability formula
Probability = number of possible outcomes/total number of outcomes
Probability of not getting 28 = 5/6
!!
Answer:
7/8
Step-by-step explanation:
A 4% peroxide solution is mixed with a 10% peroxide solution, resulting in 100 L of an 8% solution. The table shows the amount of each solution used in the mixture.What is the value of z in the table?
The value of z in the table is 40.
Explanation:To find the value of z in the table, we can set up an equation using the concentrations and amounts of the solutions. Let's denote the amount of the 4% peroxide solution as x and the amount of the 10% peroxide solution as y. We can then set up the equation:
0.04x + 0.1y = 0.08(100)
Simplifying this equation, we have:
0.04x + 0.1y = 8
Now, let's refer to the table to find the values of x and y. Since the sum of the amounts is 100 L, we have:
x + y = 100
From the information in the table, we can see that the value of x is 60. This means that y must be 40, as the sum of the amounts is 100. Now we can substitute the values of x and y into the equation:
0.04x + 0.1y = 8
0.04(60) + 0.1(40) = 8
2.4 + 4 = 8
The equation holds true, so the value of z in the table is 40.
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Subtract 5x−2 from −3x+4 .
What is the answer?
a) −8x+2
b) −8x+6
c) 8x−6
d) 2x + 2
Answer:
b) −8x+6
Step-by-step explanation:
-3x+4 - (5x-2)
Distribute the minus sign
-3x+4 -5x+2
Combine like terms
-3x-5x +4+2
-8x+6
Answer:
the answer is b -8x+6
Step-by-step explanation:
how much is 2 plus 9
For this case we must represent the following expression algebraically, in addition to indicating its result:
"2 plus 9"
So, we have:
[tex]2 + 9 =[/tex]
By law of the signs of the sum, we have that equal signs are added and the same sign is placed:
[tex]2 + 9 = 11[/tex]
ANswer:
11
What is the compund interest on 5,000 over 3 years at 5% interest
Answer:
788.13 to the nearest hundredth.
Step-by-step explanation:
Let A be the total amount in the account after 3 years.
The formula is A = P(1 + x/100)^t .
Here P = 5000, x = 5 % and the time t = 3. years.
Amount after 3 years = 5000(1 + 5/100)^3
= 5788.13
So the Interest is 5788.13 - 5000
= 788.13.
Answer:
Compound interest = 788.125
Step-by-step explanation:
Points to remember
Compound interest
A = P[1 + R/100]^N
Were A - Amount
P - Principle
R - Rate of interest
N - Number of years
To find the compound interest
Here P - 5,000
R = 5%
N - 3 years
A = P[1 + R/100]^N
= 5000[1 + 5/100]^3
= 5000[1 + 0.05]^3
= 5788.125
Compound interest = A - P
= 5788.125 - 5000
= 788.125
Explain how the quotient of powers was used to simplify this expression. 5^4/25=5^2
Answer: The quotient of powers was used because 25=5^2 which means that 5^4/25 is the same as 5^4/5^2. 5^4/5^2= 5^2. You can check your answer by simplifying 5^4 which is 625 and 5^2 which is 25, then divide the two which is 625/25 which equals 25 (or 5^2)
Step-by-step explanation:
[tex]\bf ~\hspace{7em}\textit{negative exponents} \\\\ a^{-n} \implies \cfrac{1}{a^n} ~\hspace{4.5em} a^n\implies \cfrac{1}{a^{-n}} ~\hspace{4.5em} \cfrac{a^n}{a^m}\implies a^na^{-m}\implies a^{n-m} \\\\[-0.35em] \rule{34em}{0.25pt}\\\\ \cfrac{5^4}{25}\implies \cfrac{5^4}{5^2}\implies \cfrac{5^4}{1}\cdot \cfrac{1}{5^2}\implies 5^4\cdot 5^{-2}\implies 5^{4-2}\implies 5^2[/tex]
Find x two secant lines
Anyone know the formula?
Answer:
26
Step-by-step explanation:
The formula is a half the positive difference of the measurements of the intercepted arcs.
That is you do .5(66-14) here.
I'm going to distribute first and instead of find the difference first.
.5(66)-.5(14)
33- 7
26
Or.... you could do the difference first which gives us .5(66-14)=.5(52)=26.
So that angle is 26 degrees.
Answer:
x = 26°
Step-by-step explanation:
A secant- secant angle is an angle whose vertex is outside the circle and whose sides are 2 secants of the circle. It's measure is
x = 0.5(66 - 14)° = 0.5 × 52° = 26°
Find the area of quadrilateral ABCD. [Hint: the diagonal divides the quadrilateral into two triangles.]
A. 26.47 units²
B. 28.53 units²
C. 27.28 units²
D. 33.08 units²
Answer:
B) 28.53 unit²
Step-by-step explanation:
The diagonal AD divides the quadrilateral in two triangles:
Triangle ABDTriangle ACDArea of Quadrilateral will be equal to the sum of Areas of both triangles.
i.e.
Area of ABCD = Area of ABD + Area of ACD
Area of Triangle ABD:
Area of a triangle is given as:
[tex]Area = \frac{1}{2} \times base \times height[/tex]
Base = AB = 2.89
Height = AD = 8.6
Using these values, we get:
[tex]Area = \frac{1}{2} \times 2.89 \times 8.6 = 12.43[/tex]
Thus, Area of Triangle ABD is 12.43 square units
Area of Triangle ACD:
Base = AC = 4.3
Height = CD = 7.58
Using the values in formula of area, we get:
[tex]Area = \frac{1}{2} \times 4.3 \times 7.58 = 16.30[/tex]
Thus, Area of Triangle ACD is 16.30 square units
Area of Quadrilateral ABCD:
The Area of the quadrilateral will be = 12.43 + 16.30 = 28.73 units²
None of the option gives the exact answer, however, option B gives the closest most answer. So I'll go with option B) 28.53 unit²
What is the equation of the graph below ?
Answer:
y=(x-3)^2 -2
Step-by-step explanation:
when the number to the power of two is positive the graph will aslo go up, (both ends go up as shown in the graph. the parabula of the graph is -2.
Given that sine= 21/29, what is the value of cos 0, for 0° <0<90°? A -square root of 20/29 B -20/29 C 20/29 D square root of 20/29
Answer:
Step-by-step explanation:
sin=y/r
cos=x/r
sin=21/29
cos=x/29
x^2+y^2=r^2
x^2+21^2=29^2
x^2+441=841
x=sqrt(841-441)
x=20
cos=20/29
Only |
sin + | All Positive
---------------------|-------------------
only | Only cos +
tan + |
Answer:
C
Step-by-step explanation:
Using the trigonometric identity
sin²x + cos²x = 1 ⇒ cosx = ± [tex]\sqrt{1-sin^2x}[/tex]
Given
sinx = [tex]\frac{21}{29}[/tex], then
cosx = [tex]\sqrt{1-(\frac{21}{29})^2 }[/tex] ( positive since 0 < x < 90 )
= [tex]\sqrt{1-\frac{441}{841} }[/tex]
= [tex]\sqrt{\frac{400}{841} }[/tex] = [tex]\frac{20}{29}[/tex]
Which best describes how to find the length of an arc in a circle?
A. Divide the arc's degree measure by 360°, then multiply by the
circumference of the circle.
B. Divide the arc's degree measure by 360°, then multiply by the
diameter of the circle.
C. Multiply the arc's degree measure by 360°, then divide by the
circumference of the circle.
D. Multiply the arc's degree measure by 360°, then divide by the
diameter of the circle
Answer:
A. Divide the arc's degree measure by 360°, then multiply by the circumference of the circle.Step-by-step explanation:
The first choice describes the right way to find the length of an arc in a circle.
The length of an arc is defined as
[tex]L=2\pi r (\frac{\theta}{360\°} )[/tex]
Where [tex]2\pi r[/tex] represents the circumference of the circle and [tex]\theta[/tex] represents the arc's degree measure.
So, as you can observe through this formula, we need to divide the arc's degree measure by 360°, and then multiply this result with the circumference of the circle, that's the right way based on the definition of arc length.
Therefore, the right answer is A.
The length of an arc in the circle is L = Divide the arc's degree measure by 360°, then multiply by the circumference of the circle
What is Central Angle?The central angle is an angle with two arms and a vertex in the middle of a circle. The two arms of the circle's two radii intersect the circle's arc at two separate locations. It is an angle whose vertex is the center of a circle with the two radii lines as its arms, that intersect at two different points on the circle.
The central angle of a circle formula is as follows.
Central Angle = ( s x 360° ) / 2πr
where s is the length of the arc
r is the radius of the circle
Central Angle = 2 x Angle in other segment
Given data ,
Let the length of the arc of the circle be L
Now , Central Angle = ( L x 360° ) / 2πr
where s is the length of the arc
On simplifying the equation , we get
Divide by 360° on both sides , we get
L / 2πr = Central Angle θ / 360°
Multiply by 2πr ( circumference ) on both sides , we get
L = ( θ / 360° ) x 2πr
Hence , the length of an arc is L = ( θ / 360° ) x 2πr
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What is the measure of arc BC?
Answer:
The correct answer is second option
78°
Step-by-step explanation:
Points to remember
The measure of arc BC = 2 * measure of angle BDC
To find the measure of arc BC
From the figure we can see the BD is the diameter of the given circle.
Therefore the ΔBDC is right angled triangle. m<C = 90°
m<CBD = 51° (given)
m<CBD + m<BDC = 90
m<BDC = 90 - m<CBD
= 90 - 51 = 39
Therefore measure of arc BC = 2 *m<BDC
= 2 * 39
= 78°
The correct answer is second option
78°
Latesha’s mother puts $85 in Latesha’s lunch account at school. Each day Latesha uses $3 from her account for lunch. The table below represents this situation. Latesha’s Lunch Account Day Amount Left in Account ($) 0 $85 1 2 3 4 5 How much is left in Latesha’s lunch account after she has had lunch for 5 days?
A.$15
B.$67
C.$70
D.82
Answer:
=70$
Step-by-step explanation:
The total in her account at day zero =85$
Lunch for five days= 3$×5
=15$
Total in her account= Initial amount - Expenditure on lunch
=85$-15$
=70$
The balance in Latesha's Lunch Account after having lunch for five day=70$
A boat travels 33 miles downstream in 4 hours. The return trip takes the boat 7 hours. Find the speed of the boat in still water.
Answer:
Speed of the boat in still water = 6.125 miles/hour
Step-by-step explanation:
We are given that a boat travels 33 miles downstream in 4 hours and the return trip takes the boat 7 hours.
We are to find the speed of the boat in the still water.
Assuming [tex]S_b[/tex] to be the speed of the boat in still water and [tex]S_w[/tex] to be the speed of the water.
The speeds of the boat add up when the boat and water travel in the same direction.
[tex]Speed = \frac{distance}{time}[/tex]
[tex]S_b+S_w=\frac{d}{t_1}=\frac{33 miles}{4 hours} [/tex]
And the speed of the water is subtracted from the speed of the boat when the boat is moving upstream.
[tex]S_b-S_w=\frac{d}{t_2}=\frac{33 miles}{7 hours} [/tex]
Adding the two equations to get:
[tex]S_b+S_w=\frac{d}{t_1}[/tex]
+ [tex]S_b-S_w=\frac{d}{t_2} [/tex]
___________________________
[tex]2S_b=\frac{d}{t_1} +\frac{d}{t_2}[/tex]
Solving this equation for [tex]S_b[/tex] and substituting the given values for [tex]d,t_1, t_2[/tex]:
[tex]S_b=\frac{(t_1+t_2)d}{2t_1t_2}[/tex]
[tex]S_b=\frac{(4 hour + 7hour)33 mi}{2(4hour)(7hour)}[/tex]
[tex]S_b=\frac{(11 hour)(33mi)}{56hour^2}[/tex]
[tex]S_b=6.125 mi/hr[/tex]
Therefore, the speed of the boat in still water is 6.125 miles/hour.
Answer:
[tex]6.48\frac{mi}{h}[/tex]
Step-by-step explanation:
Let' call "b" the speed of the boat and "c" the speed of the river.
We know that:
[tex]V=\frac{d}{t}[/tex]
Where "V" is the speed, "d" is the distance and "t" is the time.
Then:
[tex]d=V*t[/tex]
We know that distance traveled downstream is 33 miles and the time is 4 hours. Then, we set up the folllowing equation:
[tex]4(b+c)=33[/tex]
For the return trip:
[tex]7(b-c)=33[/tex] (Remember that in the return trip the speed of the river is opposite to the boat)
By solving thr system of equations, we get:
- Make both equations equal to each other and solve for "c".
[tex]4(b+c)=7(b-c)\\\\4b+4c=7b-7c\\\\4c+7c=7b-4b\\\\11c=3b\\\\c=\frac{3b}{11}[/tex]
- Substitute "c" into any original equation and solve for "b":
[tex]4b+\frac{3b}{11} =33\\\\4b+\frac{12b}{11}=33\\\\\frac{56b}{11}=33\\\\b=6.48\frac{mi}{h}[/tex]
What is the volume of the cone? (Use 3.14 for π .)
5,338 ft 3
355.87 ft 3
1,067.6 ft 3
1,779.33 ft 3
Answer:
1,779.33 ft³
Step-by-step explanation:
volume of cone = 1/3(pi)r²h (r=radius, h=height)
= 1/3 x 3.14 x (10)² x 17,
= 1/3 x 314 x 17
= 1/3 x 5338
= 1779.33 ft³
Answer:
just answering so this guy can get brainiest
if
[tex] \frac{a + ib}{c + id} [/tex]
is purely real complex number then prove that: ad=bc
Rewrite the given number as
[tex]\dfrac{a+ib}{c+id}=\dfrac{(a+ib)(c-id)}{(c+id)(c-id)}=\dfrac{ac+bd+i(bc-ad)}{c^2+d^2}[/tex]
If it's purely real, then the complex part should be 0, so that
[tex]\dfrac{bc-ad}{c^2+d^2}=0\implies bc-ad=0\implies\boxed{ad-bc}[/tex]
as required.
A package is in the shape of a triangular prism. The bases are right triangles with perpendicular legs measuring 9 centimeters and 12 centimeters. The distance between the bases is 10 centimeters.
What is the surface area of the triangular prism?
210 square centimeters
318 square centimeters
360 square centimeters
468 square centimeters
Answer:
The surface area of the triangular prism is 468 square centimeters. Therefore the correct option is 4.
Step-by-step explanation:
It is given that the bases are right triangles with perpendicular legs measuring 9 centimeters and 12 centimeters. Using Pythagoras theorem, the third side of the base is
[tex]hypotenuse^2=leg_1^2+leg_2^2[/tex]
[tex]hypotenuse^2=(9)^2+(12)^2[/tex]
[tex]hypotenuse^2=225[/tex]
[tex]hypotenuse=\sqrt{225}[/tex]
[tex]hypotenuse=15[/tex]
The area of a triangle is
[tex]A=\frac{1}{2}\times base \times height[/tex]
Area of the base is
[tex]A_1=\frac{1}{2}\times 9\times 12=54[/tex]
The curved surface area of triangular prism is
[tex]A_2=\text{perimeter of base}\times height[/tex]
[tex]A_2=(9+12+15)\times 10[/tex]
[tex]A_2=9\times 10+12\times 10+15\times 10[/tex]
[tex]A_2=360[/tex]
The surface area of the triangular prism is
[tex]A=2A_1+A_2[/tex]
[tex]A=2(54)+360[/tex]
[tex]A=108+360[/tex]
[tex]A=468[/tex]
The surface area of the triangular prism is 468 square centimeters. Therefore the correct option is 4.
Answer:
468 square centimeters
Step-by-step explanation:
Determine the scale factor of 5 to 10
there's a scale factor of two!
five times two is ten.
hope this helps! :) xx
b (a+b) - a (a-b) simplify
Answer:
-a^2 +2ab + b^2
Step-by-step explanation:
b (a+b) - a (a-b)
Distribute
ab +b^2 -a^2 +ab
Combine like terms
b^2 -a^2 +2ab
-a^2 +2ab + b^2
A cube has a net with area 24 in squared. How long is an edge of the cube?
The length of the edge of the cube whose net area is 24 in sq is calculated as: 2 inches.
What is the length of a cube?
The net of a cube consists of six identical square faces. Let's denote the length of one side of the square as s.
The total surface area of the cube is the sum of the areas of its six faces. Since each face has an area of s², the total surface area (A) is given by:
[tex]\[ A = 6s^2 \][/tex]
You mentioned that the net has an area of 24 square inches. Therefore, we can set up the equation:
6s² = 24
Now, solve for s:
[tex]s^2 = \frac{24}{6}[/tex]
s² = 4
Take the square root of both sides:
[tex]s = \sqrt{4}[/tex]
s = 2
So, the length of each edge of the cube is 2 inches.
Find the values of k for which the quadratic equation 2x^2 − (k + 2)x + k = 0 has real and equal roots.
Answer:
k = 2
Step-by-step explanation:
If the roots are real and equal then the condition for the discriminant is
b² - 4ac = 0
For 2x² - (k + 2)x + k = 0 ← in standard form
with a = 2, b = - (k + 2) and c = k, then
(- (k + 2))² - (4 × 2 × k ) = 0
k² + 4k + 4 - 8k = 0
k² - 4k + 4 = 0
(k - 2)² = 0
Equate factor to zero and solve for k
(k - 2)² = 0 ⇒ k - 2 = 0 ⇒ k = 2
Answer:
k = 2Step-by-step explanation:
A quadratic equation has two equal real roots if a discriminant is equal 0.
[tex]ax^2+bx+c=0[/tex]
Discriminant [tex]b^2-4ac[/tex]
We have the equation
[tex]2x^2-(k+2)x+k=0\to a=2,\ b=-(k+2),\ c=k[/tex]
Substitute:
[tex]b^2-4ac=\bigg(-(k+2)\bigg)^2-4(2)(k)\qquad\text{use}\ (a+b)^2=a^2+2ab+b^2\\\\=k^2+2(k)(2)+2^2-8k=k^2+4k+4-8k=k^2-4k+4\\\\b^2-4ac=0\iff k^2-4k+4=0\\\\k^2-2k-2k+4=0\\\\k(k-2)-2(k-2)=0\\\\(k-2)(k-2)=0\\\\(k-2)^2=0\iff k-2=0\qquad\text{add 2 to both sides}\\\\k=2[/tex]
What is the solution to the system of equations graphed below?
- 3x+2
y = 5x + 28
Answer:
(-3.25, 11.75)Step-by-step explanation:
We only need two points to plot the graph of each equation.
[tex]y=-3x+2\\\\for\ x=0\to y=-3(0)+2=0+2=2\to(0,\ 2)\\for\ x=1\to y=-3(1)+3=-3+2=-1\to(1,\ -1)\\\\y=5x+28\\\\for\ x=-4\to y=5(-4)+28=-20+28=8\to(-4,\ 8)\\for\ x=-6\to y=5(-6)+28=-30+28=-2\to(-6,\ -2)[/tex]
Look at the picture.
Read the coordinates of the intersection of the line (solution).
Write 1.47 as a mixed number or a fraction In simplest form
Answer:
[tex]\frac{147}{100}[/tex]
Step-by-step explanation:
This is the answer because 147 ÷ 100 = 1.47
Tom has 8 toys each toy weighs either 20 grams or 40 grams or 50 grams he has a diffrent number of toys (at least one) of each weight What is the smallest possible total weight of Tom's toys
Answer:
110
Step-by-step explanation:
He said he had atleast 1 of each. Hope it helps.
The smallest possible total weight of Tom's toys is:
210 grams
Step-by-step explanation:It is given that:
Tom has 8 toys each toy weighs either 20 grams or 40 grams or 50 grams.
Also, he has a different number of toys (at least one) of each weight.
Now, the smallest possible weight of Tom's toy is such that:
He has one toy of 50 grams , one of 40 grams and the other's are of smallest weight i.e. 20 grams.
This means he has 6 toys of 20 grams.
One of 40 grams.
One of 50 grams.
Hence,
Total weight= 20×6+40+50
i.e.
Total weight= 120+90
i.e.
Total weight= 210 grams.
What is the slope and y-intercept of the
graph of the equation 3y + 2x = 9?
slope =
y intercept =
Answer:
m=-2/3 (slope)
b=3 (y-intercept)
Step-by-step explanation:
Slope-intercept form is y=mx+b where the slope is m and the y-intercept is b.
You have 3y+2x=9.
We need to solve this for y to get it into y=mx+b form.
3y+2x=9
Subtract 2x on both sides:
3y =-2x+9
Divide both sides by 3:
[tex]y=\frac{-2}{3}x+\frac{9}{3}[/tex]
[tex]y=\frac{-2}{3}x+3[/tex]
Now compare this to:
y=mx+b
m=-2/3
b=3
Another way to write the value absolute value inequality |p|<12
Answer:
-12 <p <12
Step-by-step explanation:
|p|<12
We can write this without the absolute values
Take the equation with the positive value on the right hand side and take the equation with a negative value on the right side remembering to flip the inequality. Since this is less than we use and in between
p < 12 and p >-12
-12 <p <12
Step-by-step explanation:
[tex]For\ a>0\\\\|x|<a\Rightarrow x<a\ \wedge\ x>-a\\\\|x|>a\Rightarrow x>a\ \wedge\ x<-a\\\\===============================\\\\|p|<12\Rightarrow p<-12\ \wedge\ p>-12\Rightarrow-12<p<12[/tex]
Bianca has a stamp collection of 5 cent stamps and 7 cent stamps. She has 3 less 7 cent stamps as 5 cent stamps. If the collection has a face value of 87 cents, how many of each does she have?
She has ____ 5 cent stamps and ____ 7 cent stamps.
Answer:
She has 9 5 cent stamps and 6 7 cent stamps.
Step-by-step explanation:
Let the number of five cent stamps be represented by F and the number of seven cent stamps be represented by S.
The difference between the number of five cent and seven cent stamps is 3
F-S=3
The sum of the collection from each type of stamp is 87 cents
5F+7S=87
Let us solve the equations simultaneously.
F-S=3
5F+7S=87
Using substitution method,
F= 3+S
5(3+S)+7S=87
15+5S+7S=87
12S=87-15
12S=72
S=6
F=3+S
=3+6=9
Therefore the number of five cent stamps is 9 and seven cent stamps is 6.
Answer:
Number of 5 cent stamps = 9
Number of 7 cent stamps = 6
Step-by-step explanation:
We are given that Bianca has a stamp collection of 5 cent stamps and 7 cent stamps in which there are 3 less 7 cent stamps as 5 cent stamps.
If the total face value of stamps is 87 cents, we are to find the number of stamps of each value.
Assuming [tex]t[/tex] to be the number of 5 cent stamps and [tex]s[/tex] to be the 7 cent stamps so we can write it as:
[tex]0.05t+0.07s=0.87[/tex] --- (1)
[tex]s=t-3[/tex] --- (2)
Substituting this value of [tex]s[/tex] from (2) in (1):
[tex]0.05t+0.07(t-3)=0.87[/tex]
[tex]0.05s+0.07t-0.21=0.87[/tex]
[tex]0.12t=1.08[/tex]
[tex]t=9[/tex]
Number of 5 cent stamps = 9
Number of 7 cent stamps = 9 - 3 = 6