Q and A for the topic: General

at what monthly rate was a capital of R$25,005 invested which yielded R$15,000 in interest over 6 months and 15 days

for how long do we have to invest R$3005 at a rate of 36% per year to abstain R$3000 in interest?

The sum of two integers is 41 and their difference is 5. Find the integers.

If the quantity demanded by Xi is given by X1=M/2p and given that p = 10, what is the consumer surplus when p falls to 5?

The price of an entrance ticket to the pool for a child is 60 shekels and for an adult 50 shekels. group In which the number of adults is 5 times smaller than the number of children, she paid NIS 1050. How many adults and how many children in the group?

A position vector r has a magnitude of 22.5 m and a direction of 190 degrees with respect to the positive x-axis. Find its x-component and y-component.

Vector A has components Ax= -5.00 m and Ay= -8.00 m. Calculate the x- and y-components Ry of the vector R=-6.00.

I have a big conical pile of mulch. I need to find the volume of this pile. The pile is 30 yards wide at the base. It is 10 yards tall. And 60 yards long at the bottom. This pile is not in the shape of a rectangle. It is conical in shape.

What is the distance traveled by an Uber that leaves from point A (-5, 2), passes through point B (0, 2) to pick up a passenger and drops them off at point C (4, 5). Consider each unit in the plan as 1km.

100/4(2+3)

X^2 +8x=9 solve by applying the zero product property

Factor the GCF of a polynomial. -16h^9 + 24h^4

F(x+7) if f(X)=x+2

What is 3/4 minus 1/3=

2.4 x 0.8

What is 100% gain on 100,000

16. What capital should be invested in a business that yields 15% annual simple interest, to obtain $2,400,000 of profit in 8 semesters?

New Bread Bakery purchased new equipment by making a down payment of $2000 and agreeing to make payments of $458 at the end of each month for five years. Interest is 9.2% compounded monthly. What was the purchase price of the new equipment? How much interest will have to be paid?

Let ABC be any triangle and M, N and P be the points where the internal bisectors of ABC, relative respectively to the vertices A, B and C, intersect the circle circumscribed around the triangle (M ≠ A, N ≠ B and P ≠ C). Prove that the incenter of ABC is the orthocenter of MNP.

Find the general equation of the line that passes through the point P(1;-4) and is parallel to the line L:3x+y-8=0