Answer:
a=2*n*pi where n is an integer
Step-by-step explanation:
[tex]\frac{\cos^2(a)}{1-\tan(a)}+\frac{\sin^3(a)}{\sin(a)-\cos(a)}[/tex]
The denominators are different here so I'm going to try to make them the same.
I'm going to write everything in terms of sine and cosine.
That means I'm rewriting tan(a) as sin(a)/cos(a)
[tex]\frac{\cos^2(a)}{1-\frac{\sin(a)}{\cos(a)}}+\frac{\sin^3(a)}{\sin(a)-\cos(a)}[/tex]
I'm going to multiply top and bottom of the first fraction by cos(a) to clear the mini-fraction from the bigger fraction.
[tex]\frac{\cos^2(a)}{1-\frac{\sin(a)}{\cos(a)}} \cdot \frac{\cos(a)}}{\cos(a)}+\frac{\sin^3(a)}{\sin(a)-\cos(a)}[/tex]
Distributing and Simplifying:
[tex]\frac{\cos^3(a)}{\cos(a)-\sin(a)}+\frac{\sin^3(a)}{\sin(a)-\cos(a)}[/tex]
Now I see the bottom's aren't quite the same but they are almost... They are actually just the opposite. That is -(cos(a)-sin(a))=-cos(a)+sin(a)=sin(a)-cos(a).
Or -(sin(a)-cos(a))=-sin(a)+cos(a)=cos(a)-sin(a).
So to get the denominators to be the same I'm going to multiply either fraction by -1/-1... I'm going to do this to the second fraction.
[tex]\frac{\cos^3(a)}{\cos(a)-\sin(a)}+\frac{\sin^3(a)}{\sin(a)-\cos(a)} \cdot \frac{-1}{-1}[/tex]
[tex]\frac{\cos^3(a)}{\cos(a)-\sin(a)}+\frac{-\sin^3(a)}{\cos(a)-\sin(a)}[/tex]
The bottoms( the denominators) are the same now. We can write this as one fraction, now.
[tex]\frac{\cos^3(a)-\sin^3(a)}{\cos(a)-\sin(a)}[/tex]
I don't know if you know but we can factor a difference of cubes.
The numerator is in the form of a^3-b^3.
The formula for factoring that is (a-b)(a^2+ab+b^2).
[tex]\frac{(\cos(a)-\sin(a))(\cos^2(a)+\cos(a)\sin(a)+\sin^2(a)}{\cos(a)-\sin(a)}[/tex]
There is a common factor of cos(a)-sin(a) on top and bottom you can "cancel it".
So we now have
[tex]\cos^2(a)+\cos(a)\sin(a)+\sin^2(a)[/tex]
We can actually simplify this even more.
[tex]\cos^2(a)+\sin^2(a)=1[/tex] is a Pythagorean Identity.
So we rewrite [tex]\cos^2(a)+\cos(a)\sin(a)+\sin^2(a)[/tex]
as [tex]1+\cos(a)\sin(a)[/tex]
So that is what we get after simplifying left hand side.
So I guess we are trying to solve for a.
[tex]1+\cos(a)\sin(a)=\sin(a)+\cos(a)[/tex]
Subtract sin(a) and cos(a) on both sides.
[tex]\cos(a)\sin(a)-\sin(a)-\cos(a)+1=0[/tex]
This can be factored as
[tex](\sin(a)-1)(\cos(a)-1)=0[/tex]
So we just need to solve the following two equations:
[tex]\sin(a)-1=0 \text{ and } \cos(a)-1=0[/tex]
[tex]\sin(a)=1 \text{ and } cos(a)=1 \text{ I just added one on both sides}[/tex]
Now we just need to think of the y-coordinates on the unit circle that are 1
and the x-coordinates being 1 also (not at the same time of course).
List thinking of the y-coordinates being 1:
a=pi/2 , 5pi/2 , 9pi/2 , ....
List thinking of the x-coordinates being 1:
a=0, 2pi, 4pi,...
So let's come up with a pattern for these because there are infinite number of solutions that continue in this way.
If you notice in the first list the number next to pi is going up by 4 each time.
So for the first list we can say a=(4pi*n+pi)/2 where n is an integer.
The next list the number in front of pi is just even.
So for the second list we can say a=2*n*pi where n is an integer.
So the solutions is a=2*n*pi , a=(4pi*n+pi)/2
We really should make sure if this is okay for our original equation.
We don't have to worry about the second fraction because sin(a)=cos(a) only when a is pi/4 or pi/4+2pi*n OR (pi+pi/4) or (pi+pi/4)+2pi*n.
Now the second fraction we have 1-tan(a) in the denominator, and it is 0 when:
tan(a)=1
sin(a)/cos(a)=1 => sin(a)=cos(a)
So the only thing we have to worry about here since we said sin(a)=cos(a) doesn't hurt our solution is the division by the cos(a).
When is cos(a)=0?
cos(a)=0 when a=pi/2 or any rotations that stop there (+2npi thing) or at 3pi/2 (+2npi)
So the only solutions that work is the a=2*n*pi where n is an integer.
Answer:
[tex]\large\boxed{a=2k\pi\ for\ k\in\mathbb{Z}}[/tex]
Step-by-step explanation:
[tex]\bold{a=x}[/tex]
[tex]\text{The domain:}\\\\1-\tan x\neq0\ \wedge\ \sin x-\cos x\neq0\ \wedge\ x\neq\dfrac{\pi}{2}+k\pi\ (from\ \tan x)\\\\\tan x\neq1\ \wedge\ \sin x\neq\cos x\\\\x\neq\dfrac{\pi}{4}+k\pi\ \wedge\ x\neq\dfrac{\pi}{4}+k\pi\ for\ k\in\mathbb{Z}[/tex]
[tex]\dfrac{\cos^2x}{1-\tan x}+\dfrac{\sin^3x}{\sin x-\cos x}=\sin x+\cos x[/tex]
[tex]\text{Left side of the equation:}[/tex]
[tex]\text{use}\ \tan x=\dfrac{\sin x}{\cos x}\\\\\dfrac{\cos^2x}{1-\tan x}=\dfrac{\cos^2x}{1-\frac{\sin x}{\cos x}}=\dfrac{\cos^2x}{\frac{\cos x}{\cos x}-\frac{\sin x}{\cos x}}=\dfrac{\cos^2x}{\frac{\cos x-\sin x}{\cos x}}=\cos^2x\cdot\dfrac{\cos x}{\cos x-\sin x}\\\\=\dfrac{\cos^3x}{\cos x-\sin x}\\\\\dfrac{\cos^2x}{1-\tan x}+\dfrac{\sin^3x}{\sin x-\cos x}=\dfrac{\cos^3x}{\cos x-\sin x}+\dfrac{\sin^3x}{\sin x-\cos x}\\\\=\dfrac{\cos^3x}{\cos x-\sin x}+\dfrac{\sin^3x}{-(\cos x-\sin x)}[/tex]
[tex]=\dfrac{\cos^3x}{\cos x-\sin x}-\dfrac{\sin^3x}{\cos x-\sin x}\\\\=\dfrac{\cos^3x-\sin^3x}{\cos x-\sin x}\qquad\text{use}\ a^3-b^3=(a-b)(a^2+ab+b^2)\\\\=\dfrac{(\cos x-\sin x)(\cos^2x+\cos x\sin x+\sin^2x)}{\cos x-\sin x}\qquad\text{cancel}\ (\cos x-\sin x)\\\\=\cos^2x+\cos x\sin x+\sin^2x\qquad\text{use}\ \sin^2x+\cos^2x=1\\\\=\cos x\sin x+1[/tex]
[tex]\text{We're back to the equation}[/tex]
[tex]\cos x\sin x+1=\sin x+\cos x\qquad\text{subtract}\ \sin x\ \text{and}\ \cos x\ \text{from both sides}\\\\\cos x\sin x+1-\sin x-\cos x=0\\\\(\cos x\sin x-\sin x)+(1-\cos x)=0\\\\\sin x(\cos x-1)-1(\cos x-1)=0\\\\(\cos x-1)(\sin x-1)=0\iff \cos x-1=0\ or\ \sin x-1=0\\\\\cos x=1\ or\ \sin x=1\\\\x=2k\pi\in D\ or\ x=\dfrac{\pi}{2}+2k\pi\notin D\ for\ k\in\mathbb{Z}[/tex]
False rational statement?
A. Every rational number is also an integer
B. No rational number is irrational
C. Every irrational number is also real
D. Every integer is also a rational number
Answer:
D. Every integer is also a rational number
Step-by-step explanation:
Every integer is also a rational number would be FALSE about a rational statement.
Henry buys a large boat for the summer, however he cannot pay the full amount of $32,000 at
once. He puts a down payment of $14,000 for the boat and receives a loan for the rest of the
payment of the boat. The loan has an interest rate of 5.5% and is to be paid out over 4 years.
What is Henry’s monthly payment, and how much does he end up paying for the boat overall?
Answer:
Monthly Payment = $457.5
Total amount Henry end up paying for the boat overall = $35,960
Step-by-step explanation:
Total Amount to be paid = $32,000
Down Payment = $ 14,000
Interest rate = 5.5%
Total time for Amount to be paid = 4 years
Rest of the payment to be paid = 32,000 - 14,000
= 18000
Amount of interest = P*r*t
P= Principal Amount
r = rate
t = time
Putting values
Amount of interest= 0.055 *18000*4 = 3960
Total Remaining payment = 18000+3960 = 21,960
As Payment to be paid in 4 years, So number of months = 4*12 = 48 months
Monthly payment = Total Payment / Months = 21,960/48 = 457.5
So, Monthly Payment = $457.5
Total amount Henry end up paying for the boat overall = Down Payment + Remaining Payment
=14,000+21960
= 35960
So, Total amount Henry end up paying for the boat overall = $35,960
Solve for x: 2 over 5 (x − 2) = 4x. (1 point) 2 over 9 9 negative 2 over 9 negative 9 over 2
Answer:
x=-2/9 or
x = negative 2 over 9
Step-by-step explanation:
We need to solve:
[tex]\frac{2}{5}(x-2)=4x[/tex]
and find the value of x.
Solving:
[tex]\frac{2}{5}(x-2)=4x\\\frac{2x}{5}-\frac{4}{5}=4x\\ Adding \,\,4/5\,\,on\,\,both\,\,sides\\\frac{2x}{5}-\frac{4}{5}+\frac{4}{5}=4x+\frac{4}{5}\\\frac{2x}{5}=4x+\frac{4}{5}\\subtract \,\,4x\,\,from both sides\\\frac{2x}{5}-4x=\frac{4}{5}\\\frac{2x-20x}{5}=\frac{4}{5}\\\frac{-18x}{5}=\frac{4}{5}\\-18x=\frac{4}{5}*5\\-18x=4\\x=\frac{4}{-18}\\x=\frac{-2}{9}[/tex]
x=-2/9 or
x = negative 2 over 9
which of the following are necessary when proving that the diagonals of a rectangle are congruent check all that apply
Answer:
Opposite sides are congruent; All right angles are congruent
Step-by-step explanation:
Solve x 2 + 8x + 7 = 0 {-1, -7} {1, 7} {}
Answer:
Step-by-step explanation:
The y value has to be 0, so neither of those 2 answers look correct.
factor the quadratic
x^2 + 8x +7 = 0
(x + 7)(x + 1) = 0
x + 7 = 0
x = - 7
========
x + 1 = 0
x = - 1
========
The two points that solve this equation are
(-1,0)
(-7,0)
Answer:
The answer for the equation is {-1,-7}
Step-by-step explanation:
This is found by using the quadratic equation.
BRAINLIST HELP PLEASE
Answer:
B 3 ^ (1/9)
Step-by-step explanation:
We know that a^b^c = a ^ (b*c)
3 ^ (2/3)^1/6
3^ (2/3*1/6)
3^ (2/18)
3^(1/9)
A triangle has two sides of lengths 5 and 12. What value could the length of the third side be?
Answer:
Third side must be greater than 7 and less than 17
Step-by-step explanation:
If a triangle has two sides of lengths 5 and 12, the value for the length of the third side be greater than 7 and less than 17.
In the diagram of circle o, what is the measure of ZABC?
O 30°
O 40°
O 50°
O 60
Answer:
30°
Step-by-step explanation:
Line AB and BC are tangents to the given circle.
[tex] \angle \: ABC = \frac{1}{2} ( 210 - 150)[/tex]
[tex] \angle \: ABC = \frac{1}{2} (60) = 30 \degree[/tex]
Alternatively, <ABC and <AOC are supplementary because AB and BC are tangents.
[tex] \angle \: ABC + 150 \degree = 180 \degree[/tex]
[tex] \angle \: ABC = 180 \degree - 150 \degree = 30 \degree[/tex]
The correct choice is A.
Answer:30
Step-by-step explanation:
which of the two functions below has the smallest minimum y-value f(x)=4(x-6)^4+1 g(x)2x^3+28
Answer:
The function g(x) has smallest minimum y-value.
Step-by-step explanation:
The given functions are
[tex]f(x)=4(x-6)^4+1[/tex]
[tex]g(x)=2x^3+28[/tex]
The degree of f(x) is 4 and degree of g(x) is 3.
The value of any number with even power is always greater than 0.
[tex](x-6)^4\geq 0[/tex]
Multiply both sides by 4.
[tex]4(x-6)^4\geq 0[/tex]
Add 1 on both the sides.
[tex]4(x-6)^4+1\geq 0+1[/tex]
[tex]f(x)\geq 1[/tex]
The value of f(x) is always greater than 1, therefore the minimum value of f(x) is 1.
The minimum value of a 3 degree polynomial is -∞. So, the minimum value of g(x) is -∞.
Since -∞ < 1, therefore the function g(x) has smallest minimum y-value.
The function f(x)=4(x-6)^4+1 has the smallest minimum y-value as its minimum value can be directly located at y=1 while g(x)=2x^3+28, being a cubic function, continues infinitely in the negative direction.
Explanation:In this mathematical problem, we are tasked to determine which of the functions, f(x)=4(x-6)^4+1 or g(x)=2x^3+28, has the smallest minimum y-value. Each of these functions represent distinct types of polynomials which have different properties. The function f(x) is a quartic function that is even, or symmetric around the y-axis, while g(x) is a cubic function.
The minimum value of f(x) can be determined directly by setting the expression (x - 6)^4 to 0, yielding the minimum value 1 because any real number to the power of 4 is always non-negative and the smallest non-negative number is 0. For cubic functions like g(x), they do not have absolute minimum or maximum. They go from negative to positive infinity as x ranges over all real numbers. Therefore, the function f(x)=4(x-6)^4+1 has a smaller minimum y-value.
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The graph represents function 1, and the equation represents function 2:
Function 2
y = 8x + 12
How much more is the rate of change of function 2 than the rate of change of function 1?
3
If there was a graphical representation, I would be happy to assist you.
-3|x - 3|= -6
what to do, what to do :/
Answer:
X=5, X=1
Step-by-step explanation:
Okay so the | means absolute value and it is similar to a parentheses, except everything inside it becomes positive. Since there is a variable (x) inside it, you will have two scenarios then, one where everything inside is positive and where it's negative (so -3x +9 = -6 and 3x -9 =-6) You then solve for x in both equations.
Answer:
x=5 x=1
Step-by-step explanation:
-3|x - 3|= -6
Divide each side by -3
-3|x - 3|/-3= -6/-3
|x - 3|= 2
To get rid of the absolute value signs, we get two equations, one positive and one negative
x-3 =2 x-3 = -2
Add 3 to each side
x-3+3 = 2+3 x-3+3 = -2 +3
x =5 x = 1
A cylindrial hole is cut through the cylinder below.
below. The larger Cylinder has a diameter of 14 mm and a height of 25 mm. If the diameter of the hole is 10 mm, find the volume of the solid.
Answer:
V=1884 Cubic mm
Step-by-step explanation:
We know that the volume of the Sphere is given by the formula
[tex]V= \pi r^2h[/tex]
Where r is the radius and h is the height of the cylinder
We are asked to determine the radius of the hollow cylinder , which will be the difference of the solid cylinder and the cylinder being carved out.
[tex]V=V_1-V_2[/tex]
[tex]V=\pi r_1^2 \times h-\pi r_2^2 \times h[/tex]
[tex]V=\pi \times h \times (r_1^2-r_2^2)[/tex]
Where
[tex]V_1[/tex] is the the volume of solid cylinder with radius [tex]r_1[/tex] and height h
[tex]V_2[/tex] is the volume of the cylinder being carved out with radius [tex]r_2[/tex] and height h
where
[tex]r_1 = 7[/tex] mm ( Half of the bigger diameter )
[tex]r_2 = 5[/tex] mm ( Half of the inner diameter )
[tex]h=25[/tex] mm
Putting these values in the formula for V we get
[tex]V=\pi \times 25\times (7^2-5^2)[/tex]
[tex]V=3.14 \times 25 \times(49-25)[/tex]
[tex]V=3.14 \times 25 \times 24[/tex]
[tex]V= 1884[/tex]
Find the slope and the y-intercept of the equation y-36x - 1) = 0
Answer:
the slope: m = 36the y-intercept: b = 1Step-by-step explanation:
The slope-intercept form of an equation of a line:
[tex]y=mx+b[/tex]
m - slope
b - y-intercept
We have the equation
[tex]y-36x-1=0[/tex] add 36x and 1 to both sides
[tex]y-36x+36x-1+1=36x+1[/tex]
[tex]y=36x+1[/tex]
Therefore
the slope: m = 36
the y-intercept: b = 1
Help with number 3 it might be hard to read but it is possible
Answer:
This is B because as we can see the X axis increases in value to y decreases making it negetive
Answer:
the answer is B because the X axis increases in value as y decreases making it negative
Step-by-step explanation:
Find the values for m and n that would make the following equation true.
(7z^m) (nz^3) = -14z^7
m= ?
n= ?
Answer:
m=4
n=-2
Step-by-step explanation:
(7z^m) (nz^3) = -14z^7
7*n z^(m+3) = -14 z^7
We know the constants have to be the same
7n = -14
Divide each side by 7
7n/7 = -14/7
n = -2
And the exponents have to be the same
m+3 = 7
Subtract 3 from each side
m+3-3 = 7-3
m =4
The values that satisfy the equation (7z^m) (nz^3) = -14z^7 are m = 4 and n = -2, found by equating coefficients and exponents.
Explanation:To find the values for m and n that would make the given equation true, we need to equate the coefficients and the exponents of the similar terms on both sides of the equation. The original equation is (7zm) (nz3) = -14z7.
First, let's look at the coefficients: 7 * n should equal -14. This gives us the value of n directly, n = -2.
Now, let's look at the exponents of z. To equate the exponents, we use the property that when multiplying similar bases, the exponents are added: m + 3 equals 7. Solving for m gives us m = 4.
Therefore, the values that satisfy the equation are m = 4 and n = -2.
What is the standard form
See attachment for the answer.
Simplify the following expression.
x4 + 3x2 - 2x* -5x2 - x + x2 + x +1+7x4
Answer: 8x^4+x^3-4x^2+1
Step-by-step explanation:
To simplify this polynomial expression, we first combine like terms. The simplified expression will be 8x^4 - x + 1.
Explanation:The expression provided in your question is a polynomial that contains terms with variables raised to different powers. In simplifying this kind of polynomial, you first need to combine like terms, which are those terms that have the same variable and the same exponent.
Therefore, let's organize and combine like terms: x4 - 2x + x and 3x2 - 5x2 + x2 and . As a result, we get 8x4, or 8x to the power of 4, -x, and 1. Thus, the final simplified expression is: 8x4 - x + 1
Hope this helps in your understanding of simplifying polynomials!
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3. Find all the zeroes of the polynomial x4 + 2x3 - 8x2 - 18x - 9, if two of its zeroes are 3
and -3.
Answer:
2b2t
Step-by-step explanation:
2b2t
Answer:
x = 3, x = - 3, x = - 1 with multiplicity 2
Step-by-step explanation:
Given that x = 3 and x = - 3 are zeros then
(x - 3) and (x + 3) are factors and
(x - 3)(x + 3) = x² - 9 ← is a factor
Using long division to divide the polynomial by x² - 9 gives
quotient = x² + 2x + 1 = (x + 1)² and equating to zero
(x + 1)² = 0 ⇒ x + 1 = 0 ⇒ x = - 1 with multiplicity 2
Hence the zeros of the polynomial are
x = 3, x = - 3, x = - 1 with multiplicity 2
The vertices of a quadrilateral in the coordinate plans are known. How can the perimeter of the figure be found?
Answer:
The perimeter can be found by calculating lengths of sides using distance formula and then adding up the lengths
Step-by-step explanation:
If the vertices of a quadrilateral are known in the coordinate plane, the vertices can be used to determine the lengths of sides of quadrilateral. The distance formula is used for calculating the distance between two vertices which is the length of the side
[tex]d=\sqrt{(x_2-x_1)^{2}+(y_2-y_1)^{2}}[/tex]
after calculating all the lengths of four sides using their vertices, they can be summed up to find the perimeter ..
_____ are ______ midsegments of ΔWXY.
What is the perimeter of ΔWXY?
11.57 cm
12.22 cm
12.46 cm
14.50 cm
Answer:
The perimeter of Δ WXY is 14.50 cm ⇒ the last answer
Step-by-step explanation:
* Lets explain how to solve the problem
- There is a fact in any triangle; the segment joining the midpoints of
two side of a triangle is parallel to the 3rd side and half its length
* Lets use this fact to solve the problem
- In Δ WXY
∵ Q is the midpoint of WX
∵ R is the midpoint of XY
∵ S is the midpoint of YW
- By using the fact above
∴ QR = 1/2 WY
∴ RS = 1/2 WX
∴ SQ = 1/2 XY
- Lets calculate the length of the sides of Δ WXY
∵ QR = 1/2 WY
∵ QR = 2.93
∴ 2.93 = 1/2 WY ⇒ multiply both sides by 2
∴ WY = 5.86 cm
∵ RS = 1/2 WX
∵ RS = 2.04
∴ 2.04 = 1/2 WX ⇒ multiply both sides by 2
∴ WX = 4.08 cm
∵ SQ = 1/2 XY
∵ SQ = 2.28
∴ 2.28 = 1/2 XY ⇒ multiply both sides by 2
∴ XY = 4.56 cm
- Lets find the perimeter of Δ WXY
∵ The perimeter of Δ WXY = WX + XY + YW
∴ The perimeter of Δ WXY = 5.86 + 4.08 + 4.56 = 14.50
* The perimeter of Δ WXY is 14.50 cm
In this exercise we have to use the knowledge of the perimeter of a figure to calculate its value, and then:
Letter D
So from some information given in the statement and in the image, we can say that:
Q is the midpoint of WXR is the midpoint of XYS is the midpoint of YWSo solving, you will have to:
[tex]QR = 1/2 WY\\RS = 1/2 WX\\SQ = 1/2 XY[/tex]
Now with both information we can calculate the perimeter value as:
[tex]QR = 1/2 WY\\QR = 2.93\\2.93 = 1/2 WY\\ WY = 5.86 cm\\RS = 1/2 WX\\ RS = 2.04\\2.04 = 1/2 WX\\WX = 4.08 cm\\SQ = 1/2 XY\\SQ = 2.28\\2.28 = 1/2 XY \\XY = 4.56 cm\\ WXY = WX + XY + YW\\WXY = 5.86 + 4.08 + 4.56 = 14.50[/tex]
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What is the value of f (x)=16^x when x=1/2 ? A. 2 B. 4 C. 8 D. 32
Answer:
B
Step-by-step explanation:
Using the rule of exponents
[tex]a^{\frac{m}{n} }[/tex] ⇔ [tex]\sqrt[n]{a^{m} }[/tex]
Given
f(x) = [tex]16^{x}[/tex], then when x = [tex]\frac{1}{2}[/tex]
f([tex]\frac{1}{2}[/tex] ) = [tex]16^{\frac{1}{2} }[/tex] = [tex]\sqrt[2]{16}[/tex] = 4
how do you rewrite the equation V=1/3s^2h in terms of s
[tex]\bf V=\cfrac{1}{3}s^2h\implies V=\cfrac{s^2h}{3}\implies 3V=s^2 h\implies \cfrac{3V}{h}=s^2\implies \sqrt{\cfrac{3V}{h}}=s[/tex]
Answer:
s = sqrt(3V/h)
Step-by-step explanation:
To put this in terms of s, we must first isolate the s^2. So we can multiply by 3/h on both sides. So we get s^2 = 3V/h. Taking the square roots of both sides, we get s = sqrt(3V/h).
A baseball diamond is actually a square with sides of 90 feet. If a runner tries to steal second base how far must the catcher at home plate throw to get the runner out given this information explain why runners more often try to steal second base than third
Answer:
126.5 ft
Step-by-step explanation:
It's further for the catcher to throw to
The catcher must throw approximately 127.3 feet to get a runner out at second base on a square baseball diamond. The Pythagorean theorem is used to calculate the diagonal from home plate to second base. Runners often try to steal second base due to the longer throw required and being in scoring position.
Explanation:The question involves calculating the distance a catcher must throw the ball to get a runner out at second base on a baseball diamond, which is a square with sides of 90 feet. To find this distance, we must determine the diagonal of the square, as the catcher throws the ball from one corner (home plate) to the opposite corner (second base). Applying the Pythagorean theorem to the square, the diagonal distance D is given by D = √(90² + 90²). So, D = √(8100 + 8100) = √16200 feet, which approximately equals 127.3 feet. Runners are inclined to steal second base more often because it is generally easier to steal with the catcher having to make a longer throw, and once on second base, the runner is in scoring position with two bases potentially available to advance.
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#1 2 diamond rings and 4 silver rings cost $1,440. A diamond ring and a silver ring cost $660. How much does a silver ring cost?
#2 Logan and Izzy had the same number of stickers. After Izzy gave him 72 stickers, Logan had three times as many stickers as Izzy. How many stickers did they have altogether?
#3 David and Amrita had an equal number of marbles. After Armita gave 50 marbles to David he had 5 times as many marbles as her. Find the total number of marbles they
Answer:
1. multiply (2) by -2 and add to (1)
-2x-2y=-1320
add to (1) we get
4y-2y=1440-1320
2y=120
y= $60 cost of silver ring.
2. Multiplying (distributive property, we get the equivalent equation
x+72=3x-216
Adding 216 to both sides of the equal sign, we get
x+72+216=3x-216+216 --> x+288=3x
Subtracting x from both sides, we get
x+288-x=3x-x --> 288=2x
Logan and Izzy had initially had 188 stickers between the two of them.
3.
a = d before Anna gives away 50 marbles.
5 (a-50) = a +50 after Anna gives away 50 marbles.
5a - 250 = a + 50
4a = 300
a = 75
Anna has 75 marbles at the beginning and so did David.
Together they have 150 marbles.
Please answer this correctly
Answer:
3/10
Step-by-step explanation:
because the pattern is -0.15;
9/10= 0.9
3/4= 0.75
3/5= 0.6
9/20= 0.45
3/10= 0.3
the radius of the Outer Circle is 2x cm and the radius of the inside circle is 6 cm the area of the Shaded region is 288 Pi centimeters squared. What is the value of x
For this case we have that by definition, the area of a circle is given by:
[tex]A = \pi * r ^ 2[/tex]
Where:
r: It is the radius of the circle.
So, we have that the area of the shaded region is given by:
[tex]\pi * (2x) ^ 2- \pi * 6 ^ 2 = 288 \pi\\4x ^ 2-36 = 288\\4x ^ 2 = 288 + 36\\4x ^ 2 = 324[/tex]
We divide between 4 on both sides of the equation:
[tex]x ^ 2 = 81[/tex]
We apply root to both sides:
[tex]x = \pm \sqrt {81}[/tex]
We choose the positive value of the root:
[tex]x = \sqrt {81}\\x = 9[/tex]
Finally, the value of "x" is 9
Answer:
[tex]x = 9[/tex]
Please answer quickly
Combine like terms to create an equivalent expression.
-1/2 (−3y+10) It is meant to be negitave 1 over 2
Answer: 3y/2 - 5
Step-by-step explanation:
Expand
-(-3y/2 + 5)
Simplify the brackets
3y/2 - 5
If the equation of a circle is (x + 5)2 + (y - 7)2 = 36, its center point is
A(5.7)
B(-5,7)
C(5-7)
the correct answer is B) (-5, 7), which represents the center point of the circle.
The equation of a circle in standard form is given by:
[tex]\[ (x - h)^2 + (y - k)^2 = r^2 \][/tex]
Where:
- (h, k) is the center of the circle
- r is the radius of the circle
Comparing this standard form to the given equation [tex]\( (x + 5)^2 + (y - 7)^2 = 36 \)[/tex], we can identify the center and radius of the circle.
For the given equation:
- Center of the circle: (-5, 7) because the term [tex]\( (x + 5)^2 \)[/tex] means the x-coordinate of the center is -5, and the term [tex]\( (y - 7)^2 \)[/tex]means the y-coordinate of the center is 7.
- Radius of the circle: [tex]\( r = \sqrt{36} = 6 \)[/tex] because the equation is already in the form [tex]\( r^2 = 36 \), so \( r = 6 \).[/tex]
So, the correct answer is B) (-5, 7), which represents the center point of the circle.
Martin builds a right square pyramid using
straws. A diagram of the pyramid and its net
are shown.
What is the surface area of the pyramid?
Enter the answer in the box.
Answer:
360 ft^2
Step-by-step explanation:
The surface area of a right square pyramid can be found using the formula: [tex]a^2+2a\sqrt{\frac{a^2}{4}+h^2}[/tex]
In this formula:
a = base edge (the length of the sides of the square)h = height of the pyramidIn this diagram, the base edge length is 10 ft and the height of the square pyramid is 12 ft. Substitute these values into the formula to find the surface area.
[tex]a^2+2a\sqrt{\frac{a^2}{4}+h^2}[/tex][tex](10)^2+2(10)\sqrt{\frac{(10)^2}{4}+(12)^2[/tex]Simplify this expression. Start by evaluating the exponents then rewrite the expression.
[tex](100)+2(10)\sqrt{\frac{(100)}{4}+(144)[/tex]Now evaluate inside the radical sign.
[tex](100)+2(10)\sqrt{(25)+(144)[/tex][tex](100)+2(10)\sqrt{169[/tex]Multiply 2 and 10 together (we're following the rules of PEMDAS).
[tex](100)+(20)\sqrt{169[/tex]Find the square root of 169 then multiply that by 20.
[tex](100)+(20)(13)[/tex][tex](100)+(260)[/tex]Finish the problem by adding 100 and 260 together.
[tex]100 +260=360[/tex]The surface area of the pyramid is [tex]\boxed{\text {360 ft}^2}[/tex].
The digits I through 4 are randomly arranged to create
a four-digit number. What is the probability that the number formed is not divisible by 4?
The probability that the four-digit number formed is not divisible by 4 is approximately 0.875 or 87.5%.
To calculate the probability that the four-digit number formed is not divisible by 4, we need to determine the total number of possible arrangements of the digits I through 4 and then find the number of arrangements that are not divisible by 4.
Total number of arrangements:
Since there are four digits (I, 2, 3, 4), there are 4! (4 factorial) ways to arrange them without repetition.
4! = 4 × 3 × 2 × 1 = 24
Now, let's find the arrangements that are not divisible by 4:
For a number to be divisible by 4, the last two digits must form a number divisible by 4. The possible combinations of the last two digits that are divisible by 4 are: 12, 24, and 32.
So, we have three combinations (12, 24, and 32) where the number formed is divisible by 4.
Now, to find the arrangements that are not divisible by 4, subtract these three combinations from the total:
Arrangements not divisible by 4 = Total arrangements - Divisible by 4 arrangements
Arrangements not divisible by 4 = 24 - 3 = 21
Now, we can calculate the probability:
Probability = (Number of arrangements not divisible by 4) / (Total number of arrangements)
Probability = 21 / 24
Probability ≈ 0.875
So, the probability that the four-digit number formed is not divisible by 4 is approximately 0.875 or 87.5%.
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