The second angle in a triangle is one third as the first. The third angle is two thirds as large as the first angle. Plz find the angle measures (plz show work). Thanks for your help.
Answers
We know that the sum of the angles in a triangle will always equal 180°.
x + y + z = 180
We can substitute 1/3x for y and 2/3x for z in the first equation.
Collect Like Terms.
2x = 180
Divide both sides by 2.
x = 90
Substitute in the second equation.
y = 30
Substitute in the third equation.
z = 60
Let's check our values.
x = 90
y = 30
z = 60
x + y + z = 180?
90 + 30 + 60 = 180?
90 + 90 = 180?
180 = 180 YES!
This checks.
The first angle is 90°, the second angle is 30°, and the third angle is 60°.
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The manager of a company recorded the number of hourse his employees worked during each two weeks. The following statistics were calculated.Week 1: the mean was 35 hourse with a standard deviation of 1.5 hours. Week 2: The mean was 40 hourse with a standrad deviation of 2.0 hours. The manager concluded that there was more variation in the number of hours worked for week 2 that for week 1. The manager's conclusion was-?
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Which og the following represents an equation? a. 3x+13-5 b. 3+11=14 c. x+14 d. x/5-2
Answers
Answer:
10.77
Step-by-step explanation:
Answers
.0024
Answers
Answer:
(k4+3+3k3)+(-5k3+6k3+8k5)
Final result :
8k5 + k4 + 4k3 + 3
Step by step solution :
Step 1 :
Equation at the end of step 1 :
(((k4)+3)+(3•(k3)))+(((0-(5•(k3)))+(6•(k3)))+23k5)
Step 2 :
Equation at the end of step 2 :
(((k4)+3)+(3•(k3)))+(((0-(5•(k3)))+(2•3k3))+23k5)
Step 3 :
Equation at the end of step 3 :
(((k4)+3)+(3•(k3)))+(((0-5k3)+(2•3k3))+23k5)
Step 4 :
Equation at the end of step 4 :
(((k4) + 3) + 3k3) + (8k5 + k3)
Step 5 :
Checking for a perfect cube :
5.1 8k5+k4+4k3+3 is not a perfect cube
Trying to factor by pulling out :
5.2 Factoring: 8k5+k4+4k3+3
Thoughtfully split the expression at hand into groups, each group having two terms :
Group 1: k4+3
Group 2: 8k5+4k3
Pull out from each group separately :
Group 1: (k4+3) • (1)
Group 2: (2k2+1) • (4k3)
Bad news !! Factoring by pulling out fails :
The groups have no common factor and can not be added up to form a multiplication.
Polynomial Roots Calculator :
5.3 Find roots (zeroes) of : F(k) = 8k5+k4+4k3+3
Polynomial Roots Calculator is a set of methods aimed at finding values of k for which F(k)=0
Rational Roots Test is one of the above mentioned tools. It would only find Rational Roots that is numbers k which can be expressed as the quotient of two integers
The Rational Root Theorem states that if a polynomial zeroes for a rational number P/Q then P is a factor of the Trailing Constant and Q is a factor of the Leading Coefficient
In this case, the Leading Coefficient is 8 and the Trailing Constant is 3.
The factor(s) are:
of the Leading Coefficient : 1,2 ,4 ,8
of the Trailing Constant : 1 ,3
Let us test ....
P Q P/Q F(P/Q) Divisor
-1 1 -1.00 -8.00
-1 2 -0.50 2.31
-1 4 -0.25 2.93
-1 8 -0.13 2.99
-3 1 -3.00 -1968.00
-3 2 -1.50 -66.19
-3 4 -0.75 -0.27
-3 8 -0.38 2.75
1 1 1.00 16.00
1 2 0.50 3.81
1 4 0.25 3.07
1 8 0.13 3.01
3 1 3.00 2136.00
3 2 1.50 82.31
3 4 0.75 6.90
3 8 0.38 3.29
Polynomial Roots Calculator found no rational roots
Final result :
8k5 + k4 + 4k3 + 3
Step-by-step explanation:
Answers
Answer:
A: The x-intercept is x = -5 and the graph approaches a vertical asymptote at x = -6
Step-by-step explanation:
The diagram shows translated to the left graph of the logarithmic function.
This graph intersects the x-axis at point x = -5, hence the x-intercept is at x = -5.
This graph approaches to the vertical line. The line passes through the point (-6,0), so the equation of this vertical line is x = -6.
Therefore, correct option is A: The x-intercept is x = -5 and the graph approaches a vertical asymptote at x = -6
Answers
To justify the yearly membership, you want to pay at least the same amount as a no-membership purchase, otherwise you would be losing money by purchasing a yearly membership. So set the no-membership cost equal to the yearly membership cost and solve.
no-membership costs $2 per day for swimming and $5 per day for aerobic, in other words, $7 per day. So if we let d = number of days, our cost can be calculated by "7d"
a yearly membership costs $200 plus $3 per day, or in other words, "200 + 3d"
Set them equal to each other and solve:
7d = 200 + 3d
4d = 200
d = 50
So you would need to attend the classes for at least 50 days to justify a yearly membership. I hope that helps!