Final answer:
The sequence described is a divergent sequence because it consists of an infinite number of ones and does not converge to any particular value.
Step-by-step explanation:
The sequence being described is one with an infinite number of ones, yet it does not converge to any value. A sequence is said to converge if the terms get arbitrarily close to a particular value as you go further out in the sequence. Since this sequence of ones does not approach any specific value (it consistently remains at one), it does not exhibit the behavior of a convergent sequence. Therefore, the sequence is best described as a divergent sequence. The options of arithmetic or geometric sequence do not directly relate to the convergence or divergence of a sequence. In the context of this question, it is the convergence property that is most relevant.
If the measure of an angle is 80 degrees greater than its complement, we can set up the equation to solve for the angle. To do that, let's call the angle x. Its complement will be 90 - x, since complementary angles add up to 90 degrees. The problem states that x is 80 degrees greater than its complement, so: