Terms : Hide Images
| 9584854110 | Double Angle Formula for cos²(θ) |  | 0 | |
| 9584854111 | Double Angle Formula for sin²(θ) |  | 1 | |
| 9584854112 | sin(0)= |  | 2 | |
| 9584854113 | sin(π/4) |  | 3 | |
| 9584854114 | sin⁻¹(-1) |  | 4 | |
| 9584854115 | tan⁻¹(-1) |  | 5 | |
| 9584854116 | 1+cot²(θ) |  | 6 | |
| 9584854117 | 1+tan²(θ) |  | 7 | |
| 9584854118 | sin(2θ) |  | 8 | |
| 9584854119 | cos(2θ) |  | 9 | |
| 9584854120 | log(AB) |  | 10 | |
| 9584854121 | log(A / B) |  | 11 | |
| 9584854122 | log(A) ^ x |  | 12 | |
| 9584854123 | e^(ln(x)) |  | 13 | |
| 9584854124 | ln(x) / ln(a) |  | 14 | |
| 9584854125 | Simplify the expression into one log: 2 ln(x) + ln(x+1) - ln(x-1) |  | 15 | |
| 9584854126 | For what value of x is there a hole, and for what value of x is there a vertical asymptote? f(x) = ((x - a)(x - b))/ ((x - a)(x - c)) |  | 16 | |
| 9584854127 | Definition of the Derivative (Using the limit as h→0) |  | 17 | |
| 9584854128 | lim x→₀ sin(x)/x |  | 18 | |
| 9584854129 | lim x→∞ tan⁻¹(x) |  | 19 | |
| 9584854130 | First derivative test for a local max of f at x = a |  | 20 | |
| 9584854131 | First derivative test for a local min of f at x = a |  | 21 | |
| 9584854132 | Second derivative test for a local max of f at x = a |  | 22 | |
| 9584854133 | Second derivative test for a local min of f at x = a |  | 23 | |
| 9584854134 | Test for max and mins of f on [a, b] |  | 24 | |
| 9584854135 | Inflection Points |  | 25 | |
| 9584854136 | ƒ'(x) < 0 |  | 26 | |
| 9584854137 | ƒ''(x) < 0 or ƒ'(x) is decreasing |  | 27 | |
| 9584854138 | ƒ'(x) > 0 |  | 28 | |
| 9584854139 | ƒ''(x) > 0 or ƒ'(x) is increasing |  | 29 | |
| 9584854140 | Intermediate Value Theorem (IVT) |  | 30 | |
| 9584854141 | Mean Value Theorem (MVT) |  | 31 | |
| 9584854142 | Rolle's Theorem |  | 32 | |
| 9584854143 | Squeeze Theorem |  | 33 | |
| 9584854144 | ƒ(x) is continuous at x = a if... |  | 34 | |
| 9584854145 | Extreme Value Theorem |  | 35 | |
| 9584854146 | Critical Points |  | 36 | |
| 9584854147 | Three types of discontinuities. |  | 37 | |
| 9584854148 | ƒ(x) is differentiable at x = a if... |  | 38 | |
| 9584854149 | Three conditions where ƒ(x) is not differentiable |  | 39 | |
| 9584854150 | Average rate of change of ƒ(x) over [a, b] |  | 40 | |
| 9584854151 | Instantaneous rate of change of ƒ(a) |  | 41 | |
| 9584854152 | d/dx ( tan⁻¹ ( x ) ) |  | 42 | |
| 9584854153 | d/dx ( sin⁻¹ ( x ) ) |  | 43 | |
| 9584854154 | d/dx ( e ^ x ) |  | 44 | |
| 9584854155 | d/dx ( ln x ) |  | 45 | |
| 9584854156 | d/dx ( a ^ x ) |  | 46 | |
| 9584854157 | d/dx ( sin x ) |  | 47 | |
| 9584854158 | d/dx ( cos x ) |  | 48 | |
| 9584854159 | d/dx ( tan x ) |  | 49 | |
| 9584854160 | d/dx ( sec x ) |  | 50 | |
| 9584854161 | d/dx ( csc x ) |  | 51 | |
| 9584854162 | d/dx ( cot x ) |  | 52 | |
| 9584854163 | Product Rule |  | 53 | |
| 9584854164 | Quotient Rule |  | 54 | |
| 9584854165 | Chain Rule |  | 55 | |
| 9584854166 | d/dx (ƒ(x)³) |  | 56 | |
| 9584854167 | d/dx ( ln ƒ(x) ) |  | 57 | |
| 9584854168 | d/dx (e ^ ƒ(x) ) |  | 58 | |
| 9584854169 | Derivative of the Inverse of ƒ(x) |  | 59 | |
| 9584854170 | Implicit Differentiation Find dy/dx: x²/9+y²/4=1 |  | 60 | |
| 9584854171 | Equation of a line in point-slope form |  | 61 | |
| 9584854172 | Equation of the tangent line to y = ƒ(x) at x = a |  | 62 | |
| 9584854173 | A normal line to a curve is... |  | 63 | |
| 9584854174 | Velocity of a point moving along a line with position at time t given by d(t) |  | 64 | |
| 9584854175 | Speed of a point moving along a line |  | 65 | |
| 9584854176 | Average velocity of s over [a, b] |  | 66 | |
| 9584854177 | Average speed of s over [a, b] |  | 67 | |
| 9584854178 | Average acceleration given v over [a, b] |  | 68 | |
| 9584854179 | An object in motion is at rest when... |  | 69 | |
| 9584854180 | An object in motion reverses direction when... |  | 70 | |
| 9584854181 | Acceleration of a point moving along a line with position at time t given by d(t) |  | 71 | |
| 9584854182 | How to tell if a point moving along the x-axis with velocity v(t) is speeding up or slowing down at some time t? |  | 72 | |
| 9584854183 | Position at time t = b of a particle moving along a line given velocity v(t) and position s(t) at time t = a |  | 73 | |
| 9584854184 | Displacement of a particle moving along a line with velocity v(t) for a ≤ t ≤ b. |  | 74 | |
| 9584854313 | Total distance traveled by a particle moving along a line with velocity v(t) for a ≤ t ≤ b | ... |  | 75 |
| 9584854185 | The total change in ƒ(x) over [a, b] in terms of the rate of change, ƒ'(x) |  | 76 | |
| 9584854186 | Graph of y = 1/x |  | 77 | |
| 9584854187 | Graph of y = e ^ (kx) |  | 78 | |
| 9584854188 | Graph of y = ln x |  | 79 | |
| 9584854189 | Graph of y = sin x |  | 80 | |
| 9584854190 | Graph of y = cos x |  | 81 | |
| 9584854191 | Graph of y = tan x |  | 82 | |
| 9584854192 | Graph of y = tan⁻¹ x |  | 83 | |
| 9584854193 | Graph of y = √(1 - x²) |  | 84 | |
| 9584854194 | Graph of x²/a² + y²/b² = 1 |  | 85 | |
| 9584854195 | L'Hopital's Rule |  | 86 | |
| 9584854196 | To find the limits of indeterminate forms: ∞ × 0 |  | 87 | |
| 9584854197 | To find the limits of indeterminate forms: 0 ^ 0, 1 ^ ∞, ∞ ^ 0 |  | 88 | |
| 9584854198 | If ƒ(x) is increasing, then a left Riemann sum ... |  | 89 | |
| 9584854199 | If ƒ(x) is decreasing, then a left Riemann sum ... |  | 90 | |
| 9584854200 | If ƒ(x) is increasing, then a right Riemann sum ... |  | 91 | |
| 9584854201 | If ƒ(x) is decreasing, then a right Riemann sum ... |  | 92 | |
| 9584854202 | If ƒ(x) is concave up, then the trapezoidal approximation of the integral... |  | 93 | |
| 9584854203 | If ƒ(x) is concave down, then the trapezoidal approximation of the integral... |  | 94 | |
| 9584854204 | If ƒ(x) is concave up, then a midpoint Riemann sum... |  | 95 | |
| 9584854205 | If ƒ(x) is concave down, then a midpoint Riemann sum... |  | 96 | |
| 9584854206 | Area of a trapezoid |  | 97 | |
| 9584854207 | If ƒ(x) is concave down then the linear approximation... |  | 98 | |
| 9584854208 | If ƒ(x) is concave up then the linear approximation... |  | 99 | |
| 9584854209 | The Fundamental Theorem of Calculus (Part I) |  | 100 | |
| 9584854210 | The Fundamental Theorem of Calculus (Part II) |  | 101 | |
| 9584854211 | ∫ x ^ n dx = |  | 102 | |
| 9584854212 | ∫ e ^ x dx = |  | 103 | |
| 9584854213 | ∫ 1/x dx = |  | 104 | |
| 9584854214 | ∫ sin x dx = |  | 105 | |
| 9584854215 | ∫ cos x dx = |  | 106 | |
| 9584854216 | ∫ sec² x dx = |  | 107 | |
| 9584854217 | ∫ a ^ x dx = |  | 108 | |
| 9584854218 | ∫ tan x dx = |  | 109 | |
| 9584854219 | ∫ 1 / (x² + 1) dx = |  | 110 | |
| 9584854220 | ∫ 1 / √(1 - x² ) dx = |  | 111 | |
| 9584854221 | The average value of f from x = a to x = b (Mean Value Theorem for Integrals) |  | 112 | |
| 9584854222 | Integral equation for a horizontal shift of 1 unit to the right. |  | 113 | |
| 9584854223 | Adding adjacent integrals |  | 114 | |
| 9584854224 | Swapping the bounds of an integral |  | 115 | |
| 9584854225 | Exponential Growth Solution of dy/dt = kP P(0) = P₀ |  | 116 | |
| 9584854226 | lim n→∞ (1 + 1/n) ^ n |  | 117 | |
| 9584854227 | Steps to solve a differential equation |  | 118 | |
| 9584854228 | To find the area between 2 curves using vertical rectangles (dx) |  | 119 | |
| 9584854229 | To find the area between 2 curves using horizontal rectangles (dy) |  | 120 | |
| 9584854230 | Volume of a disc; rotated about a horizontal line |  | 121 | |
| 9584854231 | Volume of a washer; rotated about a horizontal line |  | 122 | |
| 9584854232 | Volume of a disc; rotated about a vertical line |  | 123 | |
| 9584854233 | Volume of a washer; rotated about a vertical line |  | 124 | |
| 9584854234 | Volume of solid if cross sections perpendicular to the x-axis are squares |  | 125 | |
| 9584854235 | Volume of solid if cross sections perpendicular to the x-axis are isosceles right triangles |  | 126 | |
| 9584854236 | Volume of solid if cross sections perpendicular to the x-axis are equilateral triangles |  | 127 | |
| 9584854237 | Volume of solid if cross sections perpendicular to the x-axis are semicircles |  | 128 | |
| 9584854238 | Volume of a prism |  | 129 | |
| 9584854239 | Volume of a cylinder |  | 130 | |
| 9584854240 | Volume of a pyramid |  | 131 | |
| 9584854241 | Volume of a cone |  | 132 | |
| 9584854242 | Volume of a sphere |  | 133 | |
| 9584854243 | Surface Area of a cylinder |  | 134 | |
| 9584854244 | Surface Area of a sphere |  | 135 | |
| 9584854245 | Area of a Sector (in radians) |  | 136 | |
| 9584854246 | Slope of a parametric curve x = x(t) and y = y(t) |  | 137 | |
| 9584854247 | Horizontal Tangent of a parametric curve |  | 138 | |
| 9584854248 | Vertical Tangent of a parametric curve |  | 139 | |
| 9584854249 | Second Derivative of a parametric curve |  | 140 | |
| 9584854250 | Velocity vector of a particle moving in the plane x = x(t) and y = y(t) |  | 141 | |
| 9584854251 | Acceleration vector of a particle moving in the plane x = x(t) and y = y(t) |  | 142 | |
| 9584854252 | Speed of a particle moving in the plane x = x(t) and y = y(t) |  | 143 | |
| 9584854253 | Distance traveled (Arc Length) by a particle moving in the plane with a ≤ t ≤ b x = x(t) and y = y(t) |  | 144 | |
| 9584854254 | Position at time t = b of a particle moving in the plane given x(a), y(a), x′(t), and y′(t). |  | 145 | |
| 9584854255 | Magnitude of a vector in terms of the x and y components |  | 146 | |
| 9584854256 | Graph of θ = c (c is a constant) |  | 147 | |
| 9584854257 | Graph of r = θ |  | 148 | |
| 9584854258 | Graphs of: r = c r = c sin(θ) r = c cos(θ) (c is a constant) |  | 149 | |
| 9584854259 | Graphs of: r = sin(k θ) r = cos(k θ) (k is a constant) |  | 150 | |
| 9584854260 | Graph of: r = 1 + cos(θ) |  | 151 | |
| 9584854261 | Graph of: r = 1 + 2 cos(θ) |  | 152 | |
| 9584854262 | Slope of polar graph r (θ) |  | 153 | |
| 9584854263 | Area enclosed by r = f(θ), α ≤ θ ≤ β |  | 154 | |
| 9584854264 | Double Angle Formula for cos²θ |  | 155 | |
| 9584854265 | Double Angle Formula for sin²θ |  | 156 | |
| 9584854266 | dx/dθ < 0 |  | 157 | |
| 9584854267 | dx/dθ > 0 |  | 158 | |
| 9584854268 | dy/dθ < 0 |  | 159 | |
| 9584854269 | dy/dθ > 0 |  | 160 | |
| 9584854270 | Convert from polar (r,θ) to rectangular (x,y) |  | 161 | |
| 9584854271 | Convert from rectangular (x,y) to polar (r,θ) |  | 162 | |
| 9584854272 | Horizontal Tangent of a Polar Graph |  | 163 | |
| 9584854273 | Vertical Tangent of a Polar Graph |  | 164 | |
| 9584854274 | Integration by Parts Formula |  | 165 | |
| 9584854275 | ∫ lnx dx = ? |  | 166 | |
| 9584854276 | Improper Integral: ∫ 1/x² dx bounds: [0,1] |  | 167 | |
| 9584854277 | Improper Integral: ∫ f(x) dx bounds: [0,∞] |  | 168 | |
| 9584854278 | Arc length of a function f(x) from x = a to x = b |  | 169 | |
| 9584854279 | Arc length of a polar graph r 0 ≤ θ ≤ π |  | 170 | |
| 9584854280 | Arc Length of a graph defined parametrically with a ≤ t ≤ b x = x(t) and y = y(t) |  | 171 | |
| 9584854281 | Differential equation for exponential growth dP/dt = ? |  | 172 | |
| 9584854282 | Solution of a differential equation for exponential growth |  | 173 | |
| 9584854283 | Differential equation for decay dP/dt = ? |  | 174 | |
| 9584854284 | Solution of a differential equation for decay |  | 175 | |
| 9584854285 | Logistic differential equation dP/dt = ? |  | 176 | |
| 9584854286 | Solution of a logistic differential equation |  | 177 | |
| 9584854287 | Graph of a Logistic Function (include inflection pt.) |  | 178 | |
| 9584854288 | Euler's Method for solving y' = F (x,y) with initial point (x₀ , y₀) |  | 179 | |
| 9584854289 | Power Series for f(x) = 1 / (1 - x) (include IOC) |  | 180 | |
| 9584854290 | Power Series for f(x) = tan⁻¹ x (include IOC) |  | 181 | |
| 9584854291 | Power Series for f(x) = ln (1 + x) (include IOC) |  | 182 | |
| 9584854292 | Taylor Series for f(x) about x = 0 (Maclaurin Series) |  | 183 | |
| 9584854293 | Taylor Series for f(x) about x = c |  | 184 | |
| 9584854294 | Maclaurin Series for f (x) = e∧x (include IOC) |  | 185 | |
| 9584854295 | Maclaurin Series for f (x) = sin x (include IOC) |  | 186 | |
| 9584854296 | Maclaurin Series for f (x) = cos x (include IOC) |  | 187 | |
| 9584854297 | Error for the partial sum, Sn, of an infinite series S |  | 188 | |
| 9584854298 | Error bound of an alternating series |  | 189 | |
| 9584854299 | Lagrange error bound |  | 190 | |
| 9584854300 | Geometric sequence (def. and conv. property) |  | 191 | |
| 9584854301 | Harmonic Series (def. and conv. property) |  | 192 | |
| 9584854302 | p-series (def. and conv. property) |  | 193 | |
| 9584854303 | Divergence Test |  | 194 | |
| 9584854304 | If lim n→∞ a(sub n) = 0, then ∑ a(sub n) for n from 1 to ∞ ... |  | 195 | |
| 9584854305 | Integral Test |  | 196 | |
| 9584854306 | Alternating Series Test |  | 197 | |
| 9584854307 | Direct Comparison Test |  | 198 | |
| 9584854308 | Limit Comparison Test |  | 199 | |
| 9584854309 | Ratio Test |  | 200 | |
| 9584854310 | n-th Root Test |  | 201 | |
| 9584854311 | Interval of Convergence (IOC) |  | 202 | |
| 9584854312 | Radius of Convergence |  | 203 |
