Question 6. Given the following equation 3x + 2y = 6, then using y=mx+c we have...
6. The equation of a line is given by the function y -mx +b. Determine the value of the X-intercept (where y 0) of the line defined by the equation y 3x+9. Using the equation for a straight line, what is the formula for the x intercept? 7. What effect will a 1.0°C error (all temperature readings are 1.0°C greater than the actual value) in determining absolute 0 K? Justify your answer. 8. What effect will a 0.10 atm error...
2. Graph the following using the slope intercept method. ( y = mx + b ) 5 d) y = -x+ 1 a) y = 3x - 1 c) y = x - 5 b) y = --x+ 3 -h -5 -4 -3 -2 -2 -2
246 The equation of a line is given by the function y mx + b. Determine the value of the X-intercept (where y 0) of the line defined by the equation y 3x + 9. Using the equation for a straight line, what is the formula for the x intercept? 6. 7. What effect will a 1.0°C error (all temperature readings are 1.0°C greater than the actual value) in determining absolute 0 K? Justify your answer. What effect will a...
246 SE 0. The equation of a line is given by the function y=mx+b. Determine the value X-intercept (where y=0) of the line defined by the equation y = 3x +9. Using the equation for a straight line, what is the formula for the x intercept 7. What effect will a 1.0°C error (all temperature readings are 1.0°C greater than the actual value) in determining absolute OK? Justify your answer. 8. Whal effect will a 0.10 atm error (reading is...
In this question, we ask you to solve the differential equation dy (3x-6)2-(2y-s) dx satisfying the initial condition 4.1 (1 mark) Hopefully, you have observed that the d.e. is separable. Thus, as a first step you need to rearrange the d.c. in the form for appropriate functions fy) and g(x) Enter such an equation, below y) dy-g(x) dx Note. The differentials dx and dy are simply entered as dx and dy, respectively separated d.e You have not attempted this yet...
Systems of Equations: 3x + y = 6 2x-2y=4 Substitution: Elimination: Solve 1 equation for 1 variable. Find opposite coefficients for 1 variable. Rearrange. Multiply equation(s) by constant(s). Plug into 2nd equation Add equations together (lose 1 variable). Solve for the other variable. Solve for variable. Then plug answer back into an original equation to solve for the 2nd variable. y = 6 -- 3x solve 1" equation for y 6x +2y = 12 multiply 1" equation by 2 2x...
Find the x-intercept and the y-intercept of each equation. 33. - 3x + 2 y = 12 34 34. 2x – 3y = 24 CHAP FUN Find the slope of the line through each pair of points. 36. (-8, 6) and (-8,-1) In ma relati types an ir 35. (-12, 3) and (-12, -7) 37. (6, -5) and (-12,-5) Find the slope of each line. 38. 3x – 2y = 3 40. x = 6 39. y = 5x +12...
32. Simplify : a. x/3-x/4 b. 3/(2x) -4/x c. 1/2x-1/3x 33. Find x if: 3x +6 = 2-5x a. b. x/m + x/n = 1 C 1/x = 3/m d. Sx/3 = 2 34. Find b if: x/(x+a) = 2/b a. b. v(x - b') =y 35. Solve the following Simultaneous linear equations and check in both equations: a) 3x+y=-4 x-2y 1 b) 5x+y=-8 2x-2y 4 Answer: x-1, y.3 36. Evaluate the expression below, if b-3 and c-2. 2bc'+(bc) Helpful...
Given the system 3x – 2y + 5z = -5 x - y + 3z = -3 4x + y + 6z= -6 Evaluate (3). Given a2 = 6 and an An = = 2an-1 + 3n find the third and fourth term.