12945144 (P.T.A.B. Apr. 20, 2017)

Ex Parte Madson

Patent Trial and Appeal BoardApr 20, 2017

12945144 (P.T.A.B. Apr. 20, 2017)

United States Patent and Trademark Office UNITED STATES DEPARTMENT OF COMMERCE United States Patent and Trademark Office Address: COMMISSIONER FOR PATENTS P.O.Box 1450 Alexandria, Virginia 22313-1450 www.uspto.gov APPLICATION NO. FILING DATE FIRST NAMED INVENTOR ATTORNEY DOCKET NO. CONFIRMATION NO. 12/945,144 11/12/2010 Michael R. Madson B09-72 7137 40990 7590 04/24/2017 ArTTSTTNFT rOMPANY EXAMINER 333 BRIDGE STREET SIMMS JR, JOHN ELLIOTT P. O. BOX 965 FAIRHAVEN, MA 02719 ART UNIT PAPER NUMBER 3711 NOTIFICATION DATE DELIVERY MODE 04/24/2017 ELECTRONIC Please find below and/or attached an Office communication concerning this application or proceeding. The time period for reply, if any, is set in the attached communication. Notice of the Office communication was sent electronically on above-indicated "Notification Date" to the following e-mail address(es): michelle_lima @ acu shnetgolf. com j oann_demers @ acu shnetgolf. com PTOL-90A (Rev. 04/07) UNITED STATES PATENT AND TRADEMARK OFFICE BEFORE THE PATENT TRIAL AND APPEAL BOARD Ex parte MICHAEL R. MADSON Appeal 2015-005110 Application 12/945,1441 Technology Center 3700 Before STEFAN STAICOVICI, GEORGE R. HOSKINS, and SEAN P. O’HANLON, Administrative Patent Judges. STAICOVICI, Administrative Patent Judge. DECISION ON APPEAL STATEMENT OF THE CASE Michael R. Madson (Appellant) appeals under 35 U.S.C. § 134(a) from the Examiner’s final decision rejecting claims 10—17.2 We have jurisdiction over this appeal under 35 U.S.C. § 6(b). SUMMARY OF DECISION We AFFIRM. 1 According to Appellant, Acushnet Company is the real party in interest. Br. 3 (filed Dec. 3,2014). 2 Claims 1—9 are canceled. Id. at 8. Appeal 2015-005110 Application 12/945,144 INVENTION Appellant’s invention relates to a golf ball having a dimple surface contour “based on a modified witch of Agnesi curve.” Spec. 1,11. 5—6. Claim 10, the sole independent claim, is representative of the claimed invention and reads as follows: 10. A golf ball having a surface with a plurality of recessed dimples thereon, wherein the cross-section of at least one dimple is a curve defined by the equation: ..Ca V(JC) =--------- ■------ ' ' + C.a Ca v V 2 j ~T Cm where the chord plane represents y = 0, the center axis of the dimple represents x = 0, a is a constant equal to the radius of a circle tangent to the curve at the center of the dimple, Ci and C 2 are constants, and d is the dimple diameter; and wherein the ratio between the chord volume, Vc, of the dimple profile and the square of the dimple diameter, d2, is: 0.. V< -4- < 0. d2 REJECTIONS The following rejections are before us for review: I. The Examiner rejected claims 10-17 under 35 U.S.C. § 112, second paragraph, as being indefinite. II. The Examiner rejected claims 10-15 under 35 U.S.C. § 103(a) as being unpatentable over Aoyama (US 2007/0149322 Al, 2 Appeal 2015-005110 Application 12/945,144 pub. June 28, 2007) and Ohama (US 2009/0221387 Al, pub. Sept. 3, 2009). III. The Examiner rejected claims 16 and 17 under 35 U.S.C. § 103(a) as being unpatentable over Aoyama, Ohama, and Alaki (US 4,681,323, iss. July 21, 1987). ANALYSIS Rejection I The Examiner finds that the limitation “the chord volume, Vc, of the dimple profile” is not clear because ‘the dimple profile is interpreted to be a two dimensional construct,” and, thus, “would not have an associated volume.” Final Act. 2 (transmitted Nov. 19, 2013). Appellant has not addressed the indefmiteness rejection of claims 10-17. See Br. 6—7. Accordingly, Appellant has waived any argument of error, and we summarily sustain the indefmiteness rejection of these claims. See Hyatt v. Dndas, 551 F.3d 1307, 1314 (Fed. Cir. 2008) (explaining that summary affirmance without consideration of the substantive merits is appropriate where an appellant fails to contest a ground of rejection). Rejection II The Examiner finds that Aoyama discloses golf ball 20 including a plurality of dimples, wherein the cross-section of each dimple is based on a curve represented by a Cartesian equation having “x” and “y” as variables, “r” as the dimple radius, and “a” as a constant. Final Act. 3 (citing Aoyama, paras. 61, 73—77, Fig. 5). The Examiner further finds that Aoyama discloses 3 Appeal 2015-005110 Application 12/945,144 the use of shape constants and the claimed ratio between dimple volume and diameter. Id. (citing Aoyama, paras. 74—78, Table 4). However, the Examiner notes that Aoyama fails to disclose “generating the curve from a relation to a circle.” Id. Nonetheless, the Examiner finds that Ohama discloses golf ball 2 having dimples 10, wherein “[t]he dimple cross-section is based on a curve having a first concave inflection as the boundary progresses away from the apex, followed by a convex inflection approaching the dimple edge, the curve being generated by circle shapes.” Id (citing Ohama, para. 84, Fig. 5). Thus, the Examiner concludes that It would have been obvious to one of ordinary skill in the art, at the time of the invention, to provide Aoyama with a two inflection curve, generated by circle shapes, defining the dimple cross-section, as taught by Ohama, to provide Aoyama with a dimple with gently sloping contours approaching the ball surface at a relatively small angle, to yield the predictable result of imparting lift to the golf ball for improving flight distance. Id. Appellant argues that the curves of Aoyama and Ohama result in cross-sectional shapes that cannot be defined by the claimed mathematical equation. Br. 6. According to Appellant, Aoyama’s curve is a catenary curve and Ohama’s is the joining of two arcs end to end. Id. at 7. In response, the Examiner first notes that the claimed geometric profile “includes a rounded bottom, with a concave curvature continuing upward to an inflection into a convex curvature portion, which reduces the sharpness of the edge of the dimple adjacent to the golf ball land.” Ans. 2 (transmitted Feb. 6, 2015). Similarly, the Examiner states that “Figure 7 [of Aoyama] depicts a dimple having a rounded bottom, with a concave 4 Appeal 2015-005110 Application 12/945,144 curvature continuing upward to an inflection near the dimple edge,” whereas, “Ohama teaches applying connecting arcs to generate the inflection in the side of the dimple profile.” Id. Thus, according to the Examiner, “[t]he prior art references teach the inventive dimple profile.” Id. Although we appreciate the Examiner’s position that combining the curves of Aoyama and Ohama results in a curve having a rounded bottom with concave and convex curvatures, this does not mean that the curve of Aoyama, as modified by Ohama, is defined by the equation of claim 10. In other words, the Examiner has not shown that when combining Aoyama’s curve represented by a catenary equation with Ohama’s two arcs represented by circle equations, the resulting curve is a representation of the equation of claim 10. The Examiner has not established that, merely because the curve of Aoyama, as modified by Ohama, has a rounded bottom with concave and convex curvatures, means that the location of each point on such a curve satisfies the equation of claim 10. The equation of claim 10 is a mathematical representation of a specific curve, namely, a modified witch of Agnesi curve. See Spec. 3,11. 3—21. In contrast, the equations representing Aoyama’s curve and Ohama’s two arcs are based on a catenary curve and a circle, respectively. See Aoyama, para.72—78, Fig. 5; Ohama, para. 84, Fig. 5. Although the curve of Aoyama, as modified by Ohama, has a rounded bottom with concave and convex curvatures, it has not been established that this means that each point on such a curve satisfies the y=f(x) relationship of claim 10. Hence, the Examiner’s determination that combining the curves of Aoyama and Ohama results in a curve based on a modified witch of Agnesi 5 Appeal 2015-005110 Application 12/945,144 curve requires speculation on the Examiner’s part. The Examiner does not articulate sufficient facts or technical reasoning to show that when combining Aoyama’s curve represented by a catenary equation with Ohama’s two arcs represented by circle equations, the resulting curve is a modified witch of Agnesi curve, as called for by the equation of claim 10. We further do not agree with the Examiner’s position that “the process for arriving at the shape of the curve amounts to a product by process limitation” because claim 10 positively recites a specific equation that represents a specific curve, namely, a modified witch of Agnesi curve. See Ans. 3; see also Final Act. 4. As speculation cannot form the basis for concluding obviousness, we do not sustain the rejection of independent claim 10, and dependent claims 11—15, under 35 U.S.C. § 103(a) as unpatentable over Aoyama and Ohama. See In re Fine, 837 F.2d 1071, 1076 (Fed. Cir. 1988). Rejection III With respect to the rejection of claims 16 and 17, the Examiner’s use of the Alaki disclosure does not remedy the deficiencies of Aoyama and Ohama, as discussed supra. See Final Act. 4—5. Therefore, for the reasons discussed above, we also do not sustain the rejection of claims 16 and 17 over the combined teachings of Aoyama, Ohama, and Alaki. SUMMARY The Examiner’s decision to reject claims 10—17 under 35 U.S.C. § 112, second paragraph, as being indefinite, is affirmed. 6 Appeal 2015-005110 Application 12/945,144 The Examiner’s decision to reject claims 10—15 under 35 U.S.C. § 103(a) as unpatentable over Aoyama and Ohama is reversed. The Examiner’s decision to reject claims 16 and 17 under 35 U.S.C. § 103(a) as unpatentable over Aoyama, Ohama, and Alaki is reversed. No time period for taking any subsequent action in connection with this appeal may be extended under 37 C.F.R. § 1.136(a). AFFIRMED 7