Two positive numbers have a difference of 5. The larger number is two more than twice the smaller. Find the two numbers.? Follow . 6 answers 6. Report Abuse ... The larger number is 5 more than twice the smaller. Find the two? The difference of two positive numbers is 9. The larger is twice the smaller decreased by 5.
So basically, the answer is 21 because 4 goes into 8, 2 times then you subtract 8-8, you'll get 0, bring down the four, 4 goes into, 1 time, subtract 4-4 and it equals 0, so you should get 21
The solutions or roots to this equation is found by solving for x. We can do this a couple ways either by FOIL or quad formula
3x^2+6x+6=0
3(x^2+2x+2)=0
x^2+2x+2=0 we cant FOIL this out so we use the quad formula
x= [(-b+\-sqrt(b^2-4ac))/2a]
x= -2+\- sqrt(4-4(1)(2))/2(1)
x= -1 +i , -1 - i
So we have complex roots since our quad formula returned a negative number. Whenever the quad formula answer is positive we have two roots/solutions, when it is zero we have one root/solution, and whenever it is negative we have Complex roots/solutions
Hope this helps. Any questions please just ask. Thank you.
Answer:
79 = 13+15+24+ missing side. 79 = 52 + missing side
Answer:
Step By Step Explanation:
Apply Rule - (-a) = a
Multiply: 4 · 6 = 24
Expand
=
Simplify
=
━ Mordancy ━