21. <DBE and <ABE are both equal halves of <ABD, so in this case, m<ABE = m<DBE, so all you have to do is solve the equation:
6x + 2 = 8x - 14
add 14 to both sides, subtract 6x from both sides.
16 = 2x
Divide both sides by two. The solution is x = 8. To find m<ABE, replace x with 2, so your final answer is 14. m<ABE = 14
22. From what we know from 21, m<ABE = m<EBD, so keep that in mind. We still have to solve for m<EBD. Since one line is 180 degrees, we are able to write out this equation using the information given:
180 = 9x - 1 (m<ABE) + 9x - 1 (m<EBD) + 24x + 14 (m<DBC)
simplify this:
180 = 12 + 42x
subtract 12 from both sides, then divide by 42.
4 = x
Now we plug this in.
4 × 9 = 36. 36 - 1 = 35.
m<EBD = 35
23. From the past two equations, we know m<ABE consistently equals m<EBD. This means that, if they are bisectors of a right angle, they both equal 45 degrees. here is our equation:
45 = 13x - 7.
we add seven to both sides and divide by 13.
4 = x
A+ny = n
a = n-ny
a = (1-y)n
a/(1-y) = n
<span>n = a/(1-y)</span>
Answer:
6^2
Step-by-step explanation:
It is written as a division problem. When dividing exponents with the same base you subtract the exponents. in this class, 7-5=2. So now you write the new exponent:
The interest is $31.202 and the amount is$1231.202.
Answer:
<em>2 times
</em>
<em></em>
Step-by-step explanation:
Please refer to the image attached of our <em>solar system </em>in which Saturn and Uranus are clearly visible.
Distance of Saturn from Sun, 
Distance of Uranus from Sun, 
We have to find, how many times the Uranus is far from Sun than Saturn is far from Sun.
Let us begin by multiplying the distance of Saturn from Sun by 2:
From above, we can say that 
is approximately <em>twice </em>of 
.
In other words, we can say that Uranus is at approximately twice distance from Sun than that of Saturn is.
