Using the Pythagorean theorem on the given conditions, the length of the quarterback's pass was calculated to be 13 yards.
The subject of this question falls under Mathematics, specifically in the topic of the Pythagorean Theorem. To solve this problem, we should recognize it as a right triangle problem. The quarterback is at one point, the goal line forms the base, and the player is at the third point. We can then use the Pythagorean Theorem (a^2 + b^2 = c^2), where c is the hypotenuse, or the path of the football.
In this case, the difference in yard lines (60 - 55 = 5 yards) and the distance to the left (12 yards) form the two other sides of the triangle. We then calculate the pass length using the formula, √((5^2) + (12^2)). The square root of (25 + 144) equals the square root of 169, which gives the answer 13 yards. Therefore, the length of the pass was 13 yards.
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Answer: E. Greater than 10
Step-by-step explanation:
First, know that number to the left of a number line are negative and the square of any negative number will be positive and a perfect square.
Since the square of the unknown number is less than 1/100 i.e 0.01 then the possible unknown number 'n' can be -0.01 itself, of which the square of -0.01 will give us 0.0001 (1/10,000) i.e a value less than 0.01.
The reciprocal of 1/10000 is 10,000 which is a value greater than 10.
Answer:
[-11,8]
Step-by-step explanation:
no need explanation, so clear
± ______
note: the 2 next to the y is an exponent.
4x + 12y = 12
2x + 6y = 12
Answer:
listo
Step-by-step explanation: