Answer to Question #182458 in Math for Olayinka

Question #182458

Q1. Differentiate y = 12x⁵ + 3x⁴ + 7x³ + x²

Q2. Find the distance between the points (2, 3) and (0, 6)

Q3. The compound interest and simple interest on a certain sum for 2 years is N1230 and N1200 respectively. The rate of interest is same for both compound interest and simple interest and it is compounded annually. What is the principal?

Expert's answer

Solution. Q1 Using the rules of differentiation and the table of derivatives, we get

"y'=12\\times5\\times x^4+3\\times4\\times x^3+7\\times3\\times x^2+2\\times x"

"y'=60x^4+12x^3+21x^2+2x"

Q2 We use the formula for the distance between two points with coordinates (x₁,y₁), (x₂,y₂)

"d=\\sqrt{(x_2-x_1)^2+(y_2-y_1)^2}."

Therefore, the distance between the points (2, 3) and (0, 6) is equal to

"d=\\sqrt{(0-2)^2+(6-3)^2}=\\sqrt{4+9}=\\sqrt{13}"

Q3 Using Simple Interest Equation (Principal + Interest)

"A=P(1+it)"

where A is the total accrued amount (principal + interest), P is the principal amount, i is the rate of interest per year in decimal, t is time period involved in years.

The compound interest formula is as follows:

"T=P(1+i)^t"

where T is total accrued, including interest; P is the principal amount; i is the rate of interest per year in decimal, t is time period involved in years.

According to the condition of the problem t= 2years, T=1230, A=1200, and the rate of interest is the same for both compound interest and simple interest and it is compounded annually.

As result get

"P(1+2i+i^2)=1230"

"P(1+2i)=1200"

Subtracting the second from the first equation, we obtain

"Pi^2=30."

Hence

"P=\\frac{30}{i^2}"

Substituting the resulting expression into the second equation, we get

"\\frac{30}{i^2}(1+2i)=1200."

Therefore

"1+2i=40i^2"

"40i^2-2i-1=0"

"D=(-2)^2-4\\times40\\times(-1)=4+160=164"

"i_1=\\frac{2-\\sqrt{164}}{80}<0"

"i_2=\\frac{2+\\sqrt{164}}{80}"

As result the principal is equl to

"P=\\frac{30}{i^2}=\\frac{30}{(\\frac{2+\\sqrt{164}}{80})^2}\\approx 876"

Answer. Q1

"y'=60x^4+12x^3+21x^2+2x"

"d=\\sqrt{13}"

"P= 876"

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Answer to Question #182458 in Math for Olayinka

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